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Similarly to this question, I'm interested in creating time series spirals. The solution doesn't necessarily have to be implemented in R or using ggplot, but it seems the majority of solutions have been implemented in R with ggplot, with a handful in Python and one in d3. My attempts so far have all used R. Unlike this question, I'm interested in displaying specific ranges of data without quantizing/binning the data. That is, I'd like to display a spiral timeline showing when particular events start and stop, where theta-min and theta-max of every event represent specific points in time.

Consider this travel data:

         trip_start            trip_stop    dist
2017-04-01 17:42:00  2017-04-01 18:34:00    1.95
2017-04-01 18:42:00  2017-04-01 19:05:00    6.54
2017-04-02 01:09:00  2017-04-02 01:12:00    1.07
2017-04-02 01:22:00  2017-04-02 01:27:00    1.03
2017-04-02 08:17:00  2017-04-02 08:23:00    1.98
2017-04-02 11:23:00  2017-04-02 11:30:00    1.98
2017-04-02 15:44:00  2017-04-02 15:56:00    4.15
2017-04-02 16:29:00  2017-04-02 16:45:00    4.08
2017-04-03 10:24:00  2017-04-03 10:55:00    19.76
2017-04-03 14:01:00  2017-04-03 14:18:00    8.21
2017-04-03 14:25:00  2017-04-03 14:31:00    1.49
2017-04-03 14:45:00  2017-04-03 14:50:00    1.59
2017-04-03 15:44:00  2017-04-03 16:10:00    4.44
2017-04-03 16:14:00  2017-04-03 16:37:00    9.96
2017-04-03 16:40:00  2017-04-03 16:45:00    0.7
2017-04-03 17:15:00  2017-04-03 17:46:00    16.92
2017-04-03 17:56:00  2017-04-03 18:19:00    5.23
2017-04-03 18:42:00  2017-04-03 18:45:00    0.49
2017-04-03 19:02:00  2017-04-03 19:04:00    0.48
2017-04-04 07:24:00  2017-04-04 07:27:00    0.66
2017-04-04 07:30:00  2017-04-04 08:04:00    13.55
2017-04-04 08:32:00  2017-04-04 09:25:00    25.09
2017-04-04 13:32:00  2017-04-04 13:40:00    3.06
2017-04-04 13:52:00  2017-04-04 13:57:00    1.3
2017-04-04 14:55:00  2017-04-04 15:01:00    2.47
2017-04-04 18:40:00  2017-04-04 19:12:00    22.71
2017-04-04 22:16:00  2017-04-04 23:54:00    38.28
2017-04-04 23:59:00  2017-04-05 00:03:00    1.02
2017-04-05 11:04:00  2017-04-05 11:49:00    25.73
2017-04-05 12:05:00  2017-04-05 12:18:00    2.97
2017-04-05 15:19:00  2017-04-05 16:25:00    25.13
2017-04-05 16:38:00  2017-04-05 16:40:00    0.41
2017-04-05 18:58:00  2017-04-05 19:02:00    1.25
2017-04-05 19:13:00  2017-04-05 19:18:00    1.09
2017-04-05 19:25:00  2017-04-05 19:48:00    6.63
2017-04-06 10:01:00  2017-04-06 10:44:00    20.81
2017-04-06 13:22:00  2017-04-06 13:33:00    1.63
2017-04-06 20:58:00  2017-04-06 21:25:00    24.85
2017-04-06 21:32:00  2017-04-06 21:56:00    6.06
2017-04-07 10:55:00  2017-04-07 11:37:00    24.53
2017-04-07 17:14:00  2017-04-07 17:48:00    19.66
2017-04-07 17:57:00  2017-04-07 18:07:00    2.12
2017-04-08 20:57:00  2017-04-08 21:06:00    1.06
2017-04-08 21:23:00  2017-04-08 21:36:00    2.97
2017-04-09 08:14:00  2017-04-09 08:19:00    1.99
2017-04-09 11:40:00  2017-04-09 11:50:00    2.24
2017-04-09 11:50:00  2017-04-09 11:57:00    1.64
2017-04-09 16:29:00  2017-04-09 16:34:00    0.53
2017-04-09 16:43:00  2017-04-09 16:45:00    0.5
2017-04-09 17:46:00  2017-04-09 17:48:00    0.44
2017-04-09 17:53:00  2017-04-09 17:56:00    0.4
2017-04-09 21:33:00  2017-04-09 21:56:00    2.48
2017-04-09 21:57:00  2017-04-09 22:14:00    2.92
2017-04-09 22:22:00  2017-04-09 22:25:00    0.9
2017-04-10 10:37:00  2017-04-10 11:22:00    19.27
2017-04-10 16:12:00  2017-04-10 16:59:00    21.31
2017-04-11 11:14:00  2017-04-11 11:18:00    1.24
2017-04-11 11:21:00  2017-04-11 11:48:00    22.95
2017-04-11 18:24:00  2017-04-11 19:05:00    28.64
2017-04-11 19:21:00  2017-04-11 19:34:00    5.37
2017-04-12 11:00:00  2017-04-12 12:08:00    28.91
2017-04-12 14:03:00  2017-04-12 15:20:00    28.56
2017-04-12 20:24:00  2017-04-12 20:29:00    1.17
2017-04-12 20:32:00  2017-04-12 21:09:00    30.89
2017-04-13 01:37:00  2017-04-13 02:09:00    32.3
2017-04-13 08:08:00  2017-04-13 08:39:00    19.39
2017-04-13 10:53:00  2017-04-13 11:23:00    24.59
2017-04-13 18:56:00  2017-04-13 19:22:00    22.74
2017-04-14 01:06:00  2017-04-14 01:37:00    31.36
2017-04-14 01:48:00  2017-04-14 01:51:00    1.03
2017-04-14 12:08:00  2017-04-14 12:22:00    1.94
2017-04-14 12:29:00  2017-04-14 13:01:00    19.07
2017-04-14 16:17:00  2017-04-14 17:03:00    19.74
2017-04-14 17:05:00  2017-04-14 17:32:00    3.99
2017-04-14 21:57:00  2017-04-14 22:02:00    1.98
2017-04-15 01:46:00  2017-04-15 01:49:00    1.07
2017-04-15 01:56:00  2017-04-15 01:58:00    1.03
2017-04-15 07:13:00  2017-04-15 07:15:00    0.45
2017-04-15 07:19:00  2017-04-15 07:21:00    0.41
2017-04-15 15:54:00  2017-04-15 16:05:00    1.94
2017-04-15 22:23:00  2017-04-15 22:26:00    0.86
2017-04-15 22:46:00  2017-04-15 22:47:00    0.25
2017-04-15 22:51:00  2017-04-15 22:53:00    0.71
2017-04-16 11:35:00  2017-04-16 11:54:00    11.4
2017-04-16 11:58:00  2017-04-16 12:15:00    10.43
2017-04-17 10:44:00  2017-04-17 10:53:00    3.04
2017-04-17 10:55:00  2017-04-17 11:22:00    18.26
2017-04-17 18:09:00  2017-04-17 18:12:00    0.85
2017-04-17 18:21:00  2017-04-17 19:07:00    37.22
2017-04-18 02:07:00  2017-04-18 02:47:00    32.41
2017-04-18 10:55:00  2017-04-18 10:57:00    0.41
2017-04-18 11:02:00  2017-04-18 11:12:00    2.3
2017-04-18 11:15:00  2017-04-18 11:52:00    24.05
2017-04-18 16:59:00  2017-04-18 17:55:00    22.66
2017-04-19 00:46:00  2017-04-19 01:35:00    39.25
2017-04-19 10:57:00  2017-04-19 11:44:00    24.06
2017-04-19 13:23:00  2017-04-19 14:10:00    25.96
2017-04-19 16:21:00  2017-04-19 17:07:00    18.05
2017-04-19 23:32:00  2017-04-20 00:19:00    39.67
2017-04-20 10:47:00  2017-04-20 11:13:00    24.07
2017-04-20 16:21:00  2017-04-20 16:30:00    0.86
2017-04-20 16:36:00  2017-04-20 16:58:00    0.85
2017-04-20 17:41:00  2017-04-20 17:44:00    0.37
2017-04-20 17:49:00  2017-04-20 18:40:00    19.32
2017-04-20 22:22:00  2017-04-20 22:53:00    29.2
2017-04-20 23:07:00  2017-04-20 23:27:00    10.94
2017-04-21 08:29:00  2017-04-21 08:40:00    1.91
2017-04-21 11:30:00  2017-04-21 11:32:00    0.42
2017-04-21 11:38:00  2017-04-21 11:40:00    0.4
2017-04-21 11:42:00  2017-04-21 12:15:00    19.09
2017-04-21 16:50:00  2017-04-21 18:17:00    40.61
2017-04-21 18:55:00  2017-04-21 19:11:00    1.73
2017-04-21 22:20:00  2017-04-21 22:53:00    28.26
2017-04-21 23:01:00  2017-04-21 23:22:00    11.76
2017-04-22 08:56:00  2017-04-22 08:58:00    0.63
2017-04-22 09:04:00  2017-04-22 09:08:00    0.3
2017-04-22 09:12:00  2017-04-22 09:15:00    0.42
2017-04-22 16:48:00  2017-04-22 16:52:00    0.54
2017-04-22 17:06:00  2017-04-22 17:09:00    0.51
2017-04-22 17:10:00  2017-04-22 17:13:00    1.03
2017-04-22 17:22:00  2017-04-22 17:27:00    1.1
2017-04-23 08:13:00  2017-04-23 08:15:00    0.41
2017-04-23 08:19:00  2017-04-23 08:20:00    0.4
2017-04-23 08:21:00  2017-04-23 08:25:00    1.99
2017-04-23 11:41:00  2017-04-23 11:48:00    2.04
2017-04-23 12:35:00  2017-04-23 12:50:00    7.59
2017-04-23 14:08:00  2017-04-23 14:21:00    7.31
2017-04-23 14:33:00  2017-04-23 15:38:00    37.6
2017-04-24 00:26:00  2017-04-24 01:18:00    39.21
2017-04-24 10:24:00  2017-04-24 10:26:00    0.41
2017-04-24 10:31:00  2017-04-24 10:35:00    1.37
2017-04-24 10:38:00  2017-04-24 10:43:00    1.19
2017-04-24 10:49:00  2017-04-24 11:15:00    19.58
2017-04-24 17:13:00  2017-04-24 18:20:00    37.42
2017-04-24 19:02:00  2017-04-24 19:08:00    1.76
2017-04-24 19:49:00  2017-04-24 19:55:00    1.79
2017-04-24 20:41:00  2017-04-24 21:16:00    32.31
2017-04-25 10:53:00  2017-04-25 11:25:00    24.83
2017-04-25 15:15:00  2017-04-25 15:24:00    3.07
2017-04-25 15:30:00  2017-04-25 15:40:00    3.01
2017-04-25 17:34:00  2017-04-25 18:18:00    24.8
2017-04-26 09:59:00  2017-04-26 10:28:00    24.05
2017-04-26 12:56:00  2017-04-26 13:40:00    29.13
2017-04-26 14:37:00  2017-04-26 15:34:00    21
2017-04-27 08:57:00  2017-04-27 10:21:00    40.56
2017-04-27 16:12:00  2017-04-27 16:44:00    9.89
2017-04-27 17:09:00  2017-04-27 18:01:00    17.51
2017-04-28 05:18:00  2017-04-28 06:06:00    39.28
2017-04-28 12:57:00  2017-04-28 13:52:00    35.82
2017-04-28 16:48:00  2017-04-28 18:14:00    39.1
2017-05-01 11:41:00  2017-05-01 12:20:00    18.74
2017-05-01 18:53:00  2017-05-01 19:34:00    37.15
2017-05-01 23:08:00  2017-05-01 23:09:00    0.06
2017-05-01 23:18:00  2017-05-02 00:11:00    38.61
2017-05-02 11:05:00  2017-05-02 11:42:00    24.07
2017-05-02 17:34:00  2017-05-02 18:53:00    26.42
2017-05-03 12:13:00  2017-05-03 12:25:00    3.96
2017-05-03 12:25:00  2017-05-03 12:56:00    21.15
2017-05-03 13:26:00  2017-05-03 13:44:00    3.32
2017-05-03 13:57:00  2017-05-03 14:08:00    3.49
2017-05-03 18:39:00  2017-05-03 19:08:00    24.85
2017-05-03 19:09:00  2017-05-03 19:13:00    0.99
2017-05-03 19:29:00  2017-05-03 19:32:00    0.84
2017-05-04 10:38:00  2017-05-04 11:06:00    24.05
2017-05-04 13:34:00  2017-05-04 14:10:00    1.73
2017-05-04 17:14:00  2017-05-04 18:23:00    24.68
2017-05-05 20:38:00  2017-05-05 20:52:00    2.24
2017-05-06 11:45:00  2017-05-06 12:30:00    20.19
2017-05-06 14:36:00  2017-05-06 15:35:00    14.49
2017-05-06 15:48:00  2017-05-06 16:17:00    5.25
2017-05-06 17:11:00  2017-05-06 17:13:00    0.43
2017-05-06 17:19:00  2017-05-06 17:21:00    0.43
2017-05-07 08:16:00  2017-05-07 08:22:00    3.27
2017-05-07 12:09:00  2017-05-07 12:16:00    2.01
2017-05-07 17:28:00  2017-05-07 17:50:00    10.36
2017-05-07 17:54:00  2017-05-07 18:01:00    1.19
2017-05-07 18:02:00  2017-05-07 18:35:00    28.31
2017-05-07 21:48:00  2017-05-07 21:52:00    1.46
2017-05-07 22:01:00  2017-05-07 22:05:00    1.37
2017-05-08 00:59:00  2017-05-08 02:19:00    39.23
2017-05-08 11:30:00  2017-05-08 11:58:00    22.55
2017-05-08 18:08:00  2017-05-08 18:30:00    10.47
2017-05-08 18:33:00  2017-05-08 19:09:00    28.44
2017-05-08 22:25:00  2017-05-08 23:09:00    38.65
2017-05-08 23:14:00  2017-05-08 23:17:00    1.04
2017-05-09 11:35:00  2017-05-09 12:19:00    23.99
2017-05-09 17:57:00  2017-05-09 18:59:00    29.38
2017-05-09 20:03:00  2017-05-09 20:13:00    1.9
2017-05-10 10:18:00  2017-05-10 10:54:00    24.06
2017-05-10 15:43:00  2017-05-10 16:46:00    24.71
2017-05-11 12:28:00  2017-05-11 13:07:00    21.75
2017-05-11 18:00:00  2017-05-11 18:31:00    19.3
2017-05-12 08:26:00  2017-05-12 08:55:00    20.46
2017-05-12 13:00:00  2017-05-12 13:34:00    14.6
2017-05-13 08:44:00  2017-05-13 08:46:00    0.38
2017-05-13 08:57:00  2017-05-13 09:01:00    0.33
2017-05-13 14:22:00  2017-05-13 14:41:00    6.86
2017-05-13 15:17:00  2017-05-13 15:35:00    5.2
2017-05-13 18:10:00  2017-05-13 18:21:00    1.91
2017-05-14 11:22:00  2017-05-14 11:26:00    0.9
2017-05-14 11:36:00  2017-05-14 11:38:00    0.39
2017-05-14 14:56:00  2017-05-14 15:59:00    40.07
2017-05-14 16:34:00  2017-05-14 16:41:00    1.49
2017-05-14 16:56:00  2017-05-14 17:04:00    1.45
2017-05-14 19:05:00  2017-05-14 20:06:00    39.21
2017-05-15 11:24:00  2017-05-15 11:33:00    1.91
2017-05-15 11:41:00  2017-05-15 12:13:00    19.84
2017-05-15 17:41:00  2017-05-15 18:11:00    16
2017-05-15 18:15:00  2017-05-15 19:23:00    31.52
2017-05-15 23:41:00  2017-05-16 00:26:00    39.32
2017-05-16 09:49:00  2017-05-16 11:02:00    24.91
2017-05-16 16:08:00  2017-05-16 16:32:00    3.37
2017-05-16 17:11:00  2017-05-16 17:32:00    4.8
2017-05-16 17:42:00  2017-05-16 17:56:00    1.81
2017-05-16 18:13:00  2017-05-16 18:46:00    24.85
2017-05-16 21:07:00  2017-05-16 21:10:00    1.04
2017-05-16 21:26:00  2017-05-16 21:29:00    1.02
2017-07-28 16:10:00  2017-07-28 16:17:00    2.22
2017-07-28 16:17:00  2017-07-28 16:42:00    7.84
2017-08-10 12:00:00  2017-08-10 12:44:00    24.05
2017-08-10 14:56:00  2017-08-10 15:10:00    1.61
2017-08-10 18:51:00  2017-08-10 19:21:00    24.85
2017-08-10 19:46:00  2017-08-10 19:56:00    1.14
2017-08-10 20:08:00  2017-08-10 20:12:00    1.09
2017-08-11 12:44:00  2017-08-11 12:49:00    0.82
2017-08-11 12:59:00  2017-08-11 13:01:00    0.56
2017-08-11 13:18:00  2017-08-11 15:12:00    1.79
2017-08-11 15:14:00  2017-08-11 16:53:00    34.6
2017-08-11 19:27:00  2017-08-11 20:34:00    34.91
2017-08-12 13:52:00  2017-08-12 13:56:00    1.05
2017-08-12 13:59:00  2017-08-12 14:02:00    0.28
2017-08-12 14:10:00  2017-08-12 14:30:00    1.22
2017-08-12 17:15:00  2017-08-12 17:36:00    11.37
2017-08-12 20:49:00  2017-08-12 21:05:00    10.43
2017-08-13 12:16:00  2017-08-13 12:44:00    12.96
2017-08-13 16:03:00  2017-08-13 16:32:00    14.33
2017-08-13 18:19:00  2017-08-13 18:42:00    9.32
2017-08-13 18:52:00  2017-08-13 19:05:00    3.99
2017-08-13 21:42:00  2017-08-13 21:53:00    5.6
2017-08-14 08:50:00  2017-08-14 09:45:00    24.1
2017-08-14 13:22:00  2017-08-14 13:54:00    24.84
2017-08-14 14:02:00  2017-08-14 15:34:00    36.92
2017-08-14 15:58:00  2017-08-14 17:17:00    35.7
2017-08-14 17:35:00  2017-08-14 17:45:00    1.99
2017-08-14 18:07:00  2017-08-14 18:27:00    9.92
2017-08-15 10:15:00  2017-08-15 10:51:00    25
2017-08-15 19:23:00  2017-08-15 19:29:00    0.4
2017-08-15 19:51:00  2017-08-15 20:45:00    24.39
2017-08-15 20:56:00  2017-08-15 21:04:00    2.78
2017-08-15 21:09:00  2017-08-15 21:37:00    19.22
2017-08-16 00:03:00  2017-08-16 00:27:00    15.51
2017-08-16 00:36:00  2017-08-16 00:41:00    1.23
2017-08-16 00:46:00  2017-08-16 01:18:00    11.35
2017-08-16 09:38:00  2017-08-16 09:41:00    1.21
2017-08-16 09:41:00  2017-08-16 09:43:00    0.08
2017-08-16 09:47:00  2017-08-16 10:32:00    22.89
2017-08-16 16:51:00  2017-08-16 17:11:00    3.14
2017-08-16 17:12:00  2017-08-16 17:25:00    2.76
2017-08-16 17:41:00  2017-08-16 18:36:00    24.78
2017-08-17 09:34:00  2017-08-17 10:13:00    24.03
2017-08-17 12:32:00  2017-08-17 13:07:00    24.82
2017-08-17 13:35:00  2017-08-17 13:40:00    0.4
2017-08-17 13:47:00  2017-08-17 15:07:00    36.06
2017-08-17 15:18:00  2017-08-17 15:24:00    0.06
2017-08-17 16:03:00  2017-08-17 18:05:00    35.16
2017-08-18 09:47:00  2017-08-18 10:23:00    24.47
2017-08-18 16:04:00  2017-08-18 16:42:00    1.63
2017-08-18 17:56:00  2017-08-18 18:25:00    10.74
2017-08-18 18:27:00  2017-08-18 18:48:00    1.85
2017-08-19 00:07:00  2017-08-19 00:41:00    18.92
2017-08-19 00:52:00  2017-08-19 00:55:00    0.99
2017-08-19 11:52:00  2017-08-19 12:14:00    7.56
2017-08-19 15:57:00  2017-08-19 16:12:00    4.02
2017-08-19 16:37:00  2017-08-19 16:56:00    5.32
2017-08-19 23:32:00  2017-08-19 23:50:00    7.54
2017-08-19 23:51:00  2017-08-20 00:17:00    9.59
2017-08-20 09:03:00  2017-08-20 09:16:00    5.22
2017-08-20 19:17:00  2017-08-20 19:32:00    4.69
2017-08-21 09:24:00  2017-08-21 09:40:00    2.31
2017-08-21 10:59:00  2017-08-21 11:02:00    0.47
2017-08-21 13:40:00  2017-08-21 15:29:00    36.09
2017-08-21 15:54:00  2017-08-21 16:48:00    2.24
2017-08-21 16:57:00  2017-08-21 18:15:00    32.3
2017-08-22 08:38:00  2017-08-22 09:06:00    0.65
2017-08-22 09:18:00  2017-08-22 09:19:00    0.04
2017-08-22 09:22:00  2017-08-22 10:05:00    23.49
2017-08-22 14:30:00  2017-08-22 15:02:00    1.7
2017-08-22 16:37:00  2017-08-22 17:41:00    24.8
2017-08-23 17:16:00  2017-08-23 18:14:00    24.01
2017-08-23 18:27:00  2017-08-23 18:32:00    1.05
2017-08-23 19:24:00  2017-08-23 20:04:00    18.14
2017-08-23 22:01:00  2017-08-23 22:28:00    16.33
2017-08-23 22:46:00  2017-08-23 22:50:00    1.04
2017-08-24 09:41:00  2017-08-24 09:44:00    0.02
2017-08-24 09:59:00  2017-08-24 10:00:00    0.02
2017-08-24 13:57:00  2017-08-24 15:33:00    42.51
2017-08-24 16:43:00  2017-08-24 17:00:00    0.07
2017-08-24 17:06:00  2017-08-24 17:33:00    10.01
2017-08-24 18:12:00  2017-08-24 19:03:00    27.67
2017-08-25 09:36:00  2017-08-25 09:55:00    2.63
2017-08-25 10:01:00  2017-08-25 10:32:00    20.92
2017-08-25 20:40:00  2017-08-25 21:45:00    17.41
2017-08-25 21:49:00  2017-08-25 22:14:00    16.02
2017-08-26 00:10:00  2017-08-26 02:14:00    29.77
2017-08-26 16:31:00  2017-08-26 16:55:00    7.15
2017-08-26 17:54:00  2017-08-26 18:19:00    10
2017-08-26 20:07:00  2017-08-26 20:08:00    0.19
2017-08-26 20:08:00  2017-08-26 20:11:00    1.35
2017-08-27 12:39:00  2017-08-27 12:54:00    1
2017-08-27 12:55:00  2017-08-27 13:48:00    9.29
2017-08-27 14:00:00  2017-08-27 14:34:00    3.86
2017-08-27 15:56:00  2017-08-27 16:37:00    10.45
2017-08-27 16:44:00  2017-08-27 16:51:00    1.8
2017-08-27 16:55:00  2017-08-27 17:00:00    0.68
2017-08-27 17:04:00  2017-08-27 17:19:00    4.96
2017-08-27 17:28:00  2017-08-27 17:39:00    2.33
2017-08-27 17:47:00  2017-08-27 18:58:00    24.19
2017-08-27 22:17:00  2017-08-27 22:41:00    16.24
2017-08-28 00:33:00  2017-08-28 01:22:00    13.62
2017-08-28 12:48:00  2017-08-28 12:51:00    0.47
2017-08-28 14:01:00  2017-08-28 14:03:00    0.4
2017-08-28 14:12:00  2017-08-28 15:31:00    34.86
2017-08-28 15:56:00  2017-08-28 17:04:00    34.47
2017-08-28 22:15:00  2017-08-28 22:38:00    18.57
2017-08-29 01:42:00  2017-08-29 02:05:00    18.88
2017-08-29 11:40:00  2017-08-29 11:44:00    1.04
2017-08-29 11:48:00  2017-08-29 12:09:00    0.03
2017-08-29 12:18:00  2017-08-29 12:21:00    0.03
2017-08-29 12:26:00  2017-08-29 12:32:00    1.05
2017-08-29 12:35:00  2017-08-29 13:15:00    24.05
2017-08-29 19:40:00  2017-08-29 19:42:00    0.35
2017-08-29 19:50:00  2017-08-29 20:19:00    27.72
2017-08-29 20:25:00  2017-08-29 20:41:00    10.42
2017-08-30 10:00:00  2017-08-30 10:47:00    24.25
2017-08-30 14:31:00  2017-08-30 14:56:00    1.68
2017-08-30 17:19:00  2017-08-30 17:43:00    0.04
2017-08-30 17:43:00  2017-08-30 17:50:00    0.29
2017-08-30 17:56:00  2017-08-30 18:40:00    16.85
2017-08-30 22:57:00  2017-08-30 23:35:00    17.31
2017-08-31 11:30:00  2017-08-31 11:41:00    0.43
2017-08-31 14:04:00  2017-08-31 14:06:00    0.41
2017-08-31 14:24:00  2017-08-31 14:26:00    0.68
2017-08-31 14:31:00  2017-08-31 15:42:00    34.88
2017-08-31 16:01:00  2017-08-31 17:07:00    30.45
2017-08-31 20:54:00  2017-08-31 21:21:00    19.6
2017-09-01 10:30:00  2017-09-01 10:59:00    17.63
2017-09-01 14:07:00  2017-09-01 15:07:00    27.45
2017-09-01 17:17:00  2017-09-01 17:36:00    1.93
2017-09-01 18:16:00  2017-09-01 19:19:00    20.58
2017-09-01 19:25:00  2017-09-01 19:38:00    4.8
2017-09-01 21:30:00  2017-09-01 21:54:00    1.94
2017-09-02 15:46:00  2017-09-02 16:06:00    0.99
2017-09-02 16:13:00  2017-09-02 16:16:00    1.01
2017-09-02 16:56:00  2017-09-02 16:59:00    0.42
2017-09-02 17:04:00  2017-09-02 17:06:00    0.4
2017-09-02 22:52:00  2017-09-02 22:54:00    0.07
2017-09-02 22:55:00  2017-09-02 23:15:00    18.62
2017-09-03 01:46:00  2017-09-03 02:10:00    18.9
2017-09-03 14:49:00  2017-09-03 15:04:00    3.14
2017-09-03 15:50:00  2017-09-03 16:07:00    10.17
2017-09-03 16:21:00  2017-09-03 16:38:00    7.79
2017-09-03 16:47:00  2017-09-03 16:52:00    1.11
2017-09-03 18:32:00  2017-09-03 18:37:00    1.2
2017-09-03 18:37:00  2017-09-03 18:44:00    0.91
2017-09-04 15:50:00  2017-09-04 15:54:00    0.42
2017-09-04 15:59:00  2017-09-04 16:11:00    2.3
2017-09-04 16:21:00  2017-09-04 16:43:00    8.31
2017-09-04 17:05:00  2017-09-04 17:15:00    2.54
2017-09-04 17:26:00  2017-09-04 17:41:00    4.52
2017-09-04 17:49:00  2017-09-04 18:25:00    29.55
2017-09-04 19:36:00  2017-09-04 19:51:00    0.93
2017-09-04 19:54:00  2017-09-04 19:59:00    0.5
2017-09-04 21:21:00  2017-09-04 21:55:00    29.37
2017-09-05 11:08:00  2017-09-05 11:51:00    35.5
2017-09-05 12:36:00  2017-09-05 13:07:00    2.29
2017-09-05 13:19:00  2017-09-05 13:22:00    0.51
2017-09-05 13:26:00  2017-09-05 14:03:00    33.09
2017-09-05 14:13:00  2017-09-05 15:01:00    24.03
2017-09-05 17:33:00  2017-09-05 18:11:00    14.55
2017-09-05 19:01:00  2017-09-05 19:19:00    11.31
2017-09-06 09:21:00  2017-09-06 09:39:00    7.73
2017-09-06 10:14:00  2017-09-06 10:30:00    7.75
2017-09-06 10:37:00  2017-09-06 11:13:00    24.13
2017-09-06 16:48:00  2017-09-06 17:35:00    25.3
2017-09-06 17:49:00  2017-09-06 17:55:00    0.18
2017-09-06 17:58:00  2017-09-06 18:00:00    0.39
2017-09-06 18:38:00  2017-09-06 19:04:00    15.93
2017-09-06 23:45:00  2017-09-07 00:14:00    19.45
2017-09-07 00:26:00  2017-09-07 00:30:00    1.01
2017-09-07 10:42:00  2017-09-07 11:35:00    31.74
2017-09-07 14:04:00  2017-09-07 14:39:00    27.38
2017-09-07 14:43:00  2017-09-07 14:52:00    3.06
2017-09-07 14:54:00  2017-09-07 16:00:00    32.96
2017-09-07 16:32:00  2017-09-07 16:33:00    0.07
2017-09-07 16:38:00  2017-09-07 17:04:00    2.31
2017-09-07 17:23:00  2017-09-07 18:14:00    33.03
2017-09-08 10:02:00  2017-09-08 10:30:00    19.73
2017-09-08 18:09:00  2017-09-08 18:37:00    18.97
2017-09-08 19:04:00  2017-09-08 19:18:00    1.87
2017-09-09 02:25:00  2017-09-09 02:28:00    1.1
2017-09-09 02:33:00  2017-09-09 02:35:00    1.05
2017-09-10 17:09:00  2017-09-10 17:44:00    14.25
2017-09-10 22:50:00  2017-09-10 22:53:00    0.25
2017-09-10 22:56:00  2017-09-10 22:57:00    0.02
2017-09-10 23:00:00  2017-09-10 23:23:00    16.18
2017-09-11 00:01:00  2017-09-11 00:19:00    1.83
2017-09-11 09:59:00  2017-09-11 10:06:00    1.91
2017-09-11 10:12:00  2017-09-11 10:51:00    27.49
2017-09-11 13:39:00  2017-09-11 14:13:00    27.23
2017-09-11 14:31:00  2017-09-11 15:31:00    35.45
2017-09-11 16:03:00  2017-09-11 17:09:00    36.01
2017-09-11 17:39:00  2017-09-11 18:01:00    9.88
2017-09-11 23:01:00  2017-09-11 23:05:00    1.14
2017-09-11 23:16:00  2017-09-11 23:30:00    5.93
2017-09-11 23:30:00  2017-09-11 23:54:00    4.94
2017-09-12 02:56:00  2017-09-12 04:00:00    25.87
2017-09-12 10:06:00  2017-09-12 10:46:00    24.84
2017-09-12 16:33:00  2017-09-12 17:20:00    22.43
2017-09-12 19:38:00  2017-09-12 20:14:00    21.79
2017-09-13 06:24:00  2017-09-13 06:59:00    25.84
2017-09-13 07:02:00  2017-09-13 07:14:00    5.77
2017-09-13 11:14:00  2017-09-13 11:36:00    16.26
2017-09-13 16:01:00  2017-09-13 16:57:00    24.79
2017-09-13 17:07:00  2017-09-13 17:48:00    15.94
2017-09-13 23:13:00  2017-09-13 23:35:00    16.73
2017-09-14 12:00:00  2017-09-14 12:27:00    19.71
2017-09-14 12:28:00  2017-09-14 12:30:00    0.18
2017-09-14 14:36:00  2017-09-14 15:06:00    14.98
2017-09-14 15:11:00  2017-09-14 15:17:00    2.99
2017-09-14 15:26:00  2017-09-14 16:44:00    37.48
2017-09-14 17:03:00  2017-09-14 18:17:00    34.18
2017-09-14 18:32:00  2017-09-14 18:41:00    3.03
2017-09-15 10:25:00  2017-09-15 10:26:00    0.05
2017-09-15 10:45:00  2017-09-15 10:48:00    0.29
2017-09-15 10:59:00  2017-09-15 11:05:00    0.3
2017-09-15 11:09:00  2017-09-15 11:36:00    10.82
2017-09-15 13:00:00  2017-09-15 13:17:00    8.37
2017-09-15 13:36:00  2017-09-15 14:30:00    25.19
2017-09-15 14:37:00  2017-09-15 15:01:00    0.45
2017-09-15 15:04:00  2017-09-15 16:59:00    85.51
2017-09-15 17:06:00  2017-09-15 18:57:00    129.72
2017-09-15 19:03:00  2017-09-15 20:02:00    60.96
2017-09-16 10:18:00  2017-09-16 10:39:00    16.04
2017-09-16 11:52:00  2017-09-16 12:12:00    16.68
2017-09-16 12:28:00  2017-09-16 13:29:00    49
2017-09-16 18:36:00  2017-09-16 19:30:00    45.7
2017-09-16 19:39:00  2017-09-16 19:47:00    2.1
2017-09-17 13:32:00  2017-09-17 13:41:00    2.24
2017-09-17 14:19:00  2017-09-17 14:48:00    14.68
2017-09-17 18:25:00  2017-09-17 18:26:00    0.05
2017-09-17 18:36:00  2017-09-17 19:03:00    12.26
2017-09-18 07:52:00  2017-09-18 08:03:00    2.04
2017-09-18 08:21:00  2017-09-18 08:56:00    37.94
2017-09-18 09:01:00  2017-09-18 09:53:00    65.7
2017-09-18 10:04:00  2017-09-18 10:34:00    39.43
2017-09-18 10:46:00  2017-09-18 11:07:00    14.25
2017-09-18 11:19:00  2017-09-18 13:29:00    138.98
2017-09-18 14:24:00  2017-09-18 14:26:00    0.04
2017-09-18 14:28:00  2017-09-18 15:23:00    35.52
2017-09-18 15:53:00  2017-09-18 17:49:00    36.64
2017-09-19 09:24:00  2017-09-19 10:22:00    24.37
2017-09-19 15:55:00  2017-09-19 16:53:00    15.87
2017-09-19 16:53:00  2017-09-19 17:20:00    0.85
2017-09-19 17:33:00  2017-09-19 18:06:00    10.95
2017-09-19 18:10:00  2017-09-19 18:34:00    8.41
2017-09-19 21:06:00  2017-09-19 21:10:00    1.24
2017-09-19 21:17:00  2017-09-19 21:21:00    1.05
2017-09-20 11:12:00  2017-09-20 11:16:00    1.22
2017-09-20 11:18:00  2017-09-20 11:59:00    24.15
2017-09-20 17:20:00  2017-09-20 18:07:00    24.15
2017-09-20 18:50:00  2017-09-20 19:17:00    16.02
2017-09-20 22:05:00  2017-09-20 22:32:00    17.5
2017-09-21 13:38:00  2017-09-21 13:44:00    0.72
2017-09-21 13:50:00  2017-09-21 15:26:00    35.81
2017-09-21 15:59:00  2017-09-21 16:15:00    8.26
2017-09-21 16:19:00  2017-09-21 17:32:00    28.1
2017-09-21 18:49:00  2017-09-21 19:25:00    16.05
2017-09-21 22:30:00  2017-09-21 22:59:00    16.97
2017-09-22 10:19:00  2017-09-22 10:21:00    0.43
2017-09-22 10:25:00  2017-09-22 10:26:00    0.4
2017-09-22 10:30:00  2017-09-22 10:54:00    19.15
2017-09-22 11:58:00  2017-09-22 12:02:00    1.05
2017-09-22 18:32:00  2017-09-22 18:59:00    20.95
2017-09-23 08:34:00  2017-09-23 08:51:00    1.15
2017-09-23 09:19:00  2017-09-23 10:31:00    37.57
2017-09-23 11:09:00  2017-09-23 11:23:00    5.67
2017-09-23 11:51:00  2017-09-23 12:15:00    4.64
2017-09-23 12:47:00  2017-09-23 13:40:00    8.45
2017-09-23 13:56:00  2017-09-23 15:08:00    34.62
2017-09-23 15:37:00  2017-09-23 16:07:00    1.56
2017-09-24 14:59:00  2017-09-24 15:02:00    0.43
2017-09-24 15:14:00  2017-09-24 17:09:00    6.6
2017-09-24 17:37:00  2017-09-24 18:01:00    7.05
2017-09-24 18:05:00  2017-09-24 18:07:00    0.41
2017-09-24 19:35:00  2017-09-24 20:31:00    25.28
2017-09-25 00:24:00  2017-09-25 00:26:00    0.42
2017-09-25 00:30:00  2017-09-25 01:10:00    23.13
2017-09-25 12:12:00  2017-09-25 12:38:00    19.45
2017-09-25 14:22:00  2017-09-25 14:50:00    19.86
2017-09-25 14:52:00  2017-09-25 15:54:00    35.53
2017-09-25 16:37:00  2017-09-25 18:17:00    34.54
2017-09-25 20:36:00  2017-09-25 21:08:00    28.91
2017-09-26 01:46:00  2017-09-26 02:21:00    26.32
2017-09-26 09:36:00  2017-09-26 10:18:00    24.02
2017-09-26 14:05:00  2017-09-26 14:39:00    25.3
2017-09-26 15:49:00  2017-09-26 15:58:00    1.53
2017-09-26 16:15:00  2017-09-26 16:22:00    1.1
2017-09-27 09:15:00  2017-09-27 10:16:00    24.76
2017-09-27 16:26:00  2017-09-27 17:49:00    35.87
2017-09-27 17:58:00  2017-09-27 18:46:00    27.64
2017-09-27 18:51:00  2017-09-27 18:59:00    2.08
2017-09-27 19:10:00  2017-09-27 20:17:00    21.17
2017-09-27 20:25:00  2017-09-27 21:56:00    3.6
2017-09-27 22:04:00  2017-09-27 22:32:00    16.56
2017-09-28 06:46:00  2017-09-28 07:19:00    14.4
2017-09-28 09:05:00  2017-09-28 09:29:00    8.06
2017-09-28 10:41:00  2017-09-28 11:21:00    22.34
2017-09-28 14:26:00  2017-09-28 16:05:00    35.57
2017-09-28 16:09:00  2017-09-28 16:21:00    1.17
2017-09-28 20:37:00  2017-09-28 20:40:00    1.1
2017-09-28 20:56:00  2017-09-28 21:00:00    1.15
2017-09-29 09:32:00  2017-09-29 10:02:00    19.73

I'd like to plot these discrete events the same way the below plots do, but where 2pi is one week rather than 24 hours in order to illuminate the periodicity of these events, where color represents distance.

Discrete events in a spiral time series plot Discrete time series spiral plot

I've attempted modifying the solution linked at the beginning of this question, but it hasn't gotten me anywhere. My new approach is to modify this solution, but I'm having a difficult time getting anything but horizontal and vertical lines scattered about a spiral. Making them curve and display in the correct locations is tough.

I'm open to any approach that successfully displays the data in a spiral plot without quantizing/binning it into specific intervals but rather allows the intervals themselves to describe discrete events along a continuous spiralling timeline. Likewise, I'm not interested in converting this to a raw single-point time series format where I'd have a great deal of data representing the time between trips. I'd like to achieve this in a temporal format (one that describes a time window rather than an event at a particular time).

16
+50

Still needs work, but it's a start, with python and matplotlib.

The idea is to plot a spiral timeline in polar coordinates with 1 week period, each event is an arc of this spiral with a color depending on dist data.

There are lots of overlapping intervals though that this visualization tends to hide... maybe semitransparent arcs could be better, with a carefully chosen colormap.

import numpy as np
import matplotlib as mpl
import matplotlib.pyplot as plt
import matplotlib.patheffects as mpe
import pandas as pd

# styling
LINEWIDTH=4
EDGEWIDTH=1
CAPSTYLE="projecting"
COLORMAP="viridis_r"
ALPHA=1
FIRSTDAY=6 # 0=Mon, 6=Sun

# load dataset and parse timestamps
df = pd.read_csv('trips.csv')
df[['trip_start', 'trip_stop']] = df[['trip_start', 'trip_stop']].apply(pd.to_datetime)

# set origin at the first FIRSTDAY before the first trip, midnight
first_trip = df['trip_start'].min()
origin = (first_trip - pd.to_timedelta(first_trip.weekday() - FIRSTDAY, unit='d')).replace(hour=0, minute=0, second=0)
weekdays = pd.date_range(origin, origin + np.timedelta64(1, 'W')).strftime("%a").tolist()

# # convert trip timestamps to week fractions
df['start'] = (df['trip_start'] - origin) / np.timedelta64(1, 'W')
df['stop']  = (df['trip_stop']  - origin) / np.timedelta64(1, 'W')

# sort dataset so shortest trips are plotted last
# should prevent longer events to cover shorter ones, still suboptimal
df = df.sort_values('dist', ascending=False).reset_index()

fig = plt.figure(figsize=(8, 6))
ax = fig.gca(projection="polar")

for idx, event in df.iterrows():
    # sample normalized distance from colormap
    ndist = event['dist'] / df['dist'].max()
    color = plt.cm.get_cmap(COLORMAP)(ndist)
    tstart, tstop = event.loc[['start', 'stop']]
    # timestamps are in week fractions, 2pi is one week
    nsamples = int(1000. * (tstop - tstart))
    t = np.linspace(tstart, tstop, nsamples)
    theta = 2 * np.pi * t
    arc, = ax.plot(theta, t, lw=LINEWIDTH, color=color, solid_capstyle=CAPSTYLE, alpha=ALPHA)
    if EDGEWIDTH > 0:
        arc.set_path_effects([mpe.Stroke(linewidth=LINEWIDTH+EDGEWIDTH, foreground='black'), mpe.Normal()])

# grid and labels
ax.set_rticks([])
ax.set_theta_zero_location("N")
ax.set_theta_direction(-1)
ax.set_xticks(np.linspace(0, 2*np.pi, 7, endpoint=False))
ax.set_xticklabels(weekdays)
ax.tick_params('x', pad=2)
ax.grid(True)
# setup a custom colorbar, everything's always a bit tricky with mpl colorbars
vmin = df['dist'].min()
vmax = df['dist'].max()
norm = mpl.colors.Normalize(vmin=vmin, vmax=vmax)
sm = plt.cm.ScalarMappable(cmap=COLORMAP, norm=norm)
sm.set_array([])
plt.colorbar(sm, ticks=np.linspace(vmin, vmax, 10), fraction=0.04, aspect=60, pad=0.1, label="distance", ax=ax)

plt.savefig("spiral.png", pad_inches=0, bbox_inches="tight")

trips plot

Full timeline

To see it's a spiral that never overlaps and it works for longer events too you can plot the full timeline (here with LINEWIDTH=3.5 to limit moiré fringing).

fullt = np.linspace(df['start'].min(), df['stop'].max(), 10000)
theta = 2 * np.pi * fullt
ax.plot(theta, fullt, lw=LINEWIDTH,
        path_effects=[mpe.Stroke(linewidth=LINEWIDTH+LINEBORDER, foreground='black'), mpe.Normal()])

full timeline

Example with a random set...

Here's the plot for a random dataset of 200 mainly short trips with the occasional 1 to 2 weeks long ones.

N = 200
df = pd.DataFrame()
df["start"] = np.random.uniform(0, 20, size=N)
df["stop"] = df["start"] + np.random.choice([np.random.uniform(0, 0.1),
                                             np.random.uniform(1., 2.)], p=[0.98, 0.02], size=N)
df["dist"] = np.random.random(size=N)

random events

... and different styles

inferno_r color map, rounded or butted linecaps, semitransparent, bolder edges, etc (click for full size)

rounded edges, less crowded white rounded edges semitransparent butted overlapping

  • Great start! How tolerant is this of long events? It appears the events are made of individual rectangles rather than arcs. While this works for short events, the longer the event, the greater the probability of overlap with other events. Is there a way to give them curvature? – Nate Gardner May 18 '18 at 8:40
  • @NateGardner do you have some sample data with longer events to share? they are spiral arcs so they shouldn't overlap unless the line width is too thick – filippo May 18 '18 at 8:43
  • @NateGardner see the edit, no overlapping with an event covering the whole timeline – filippo May 18 '18 at 8:58
7

Here's a start. Let me know if this is what you had in mind.

I began with your data sample and put trip_start and trip_stop into POSIXct format before continuing with the code below.

library(tidyverse)
library(lubridate)

dat = dat %>% 
  mutate(start=(hour(trip_start)*60 + minute(trip_start) + second(trip_start))/(24*60) + wday(trip_start),
         stop=(hour(trip_stop)*60 + minute(trip_stop) + second(trip_stop))/(24*60) + wday(trip_stop),
         tod = case_when(hour(trip_start) < 6 ~ "night",
                         hour(trip_start) < 12 ~ "morning",
                         hour(trip_start) < 18 ~ "afternoon",
                         hour(trip_start) < 24 ~ "evening"))

ggplot(dat) +
  geom_segment(aes(x=start, xend=stop, 
                   y=trip_start, 
                   yend=trip_stop, 
                   colour=tod), 
               size=5, show.legend = FALSE) +
  coord_polar() +
  scale_y_datetime(breaks=seq(as.POSIXct("2017-09-01"), as.POSIXct("2017-12-31"), by="week")) +
  scale_x_continuous(limits=c(1,8), breaks=1:7, 
                     labels=weekdays(x=as.Date(seq(7)+2, origin="1970-01-01"), 
                                     abbreviate=TRUE))+
  expand_limits(y=as.POSIXct("2017-08-25")) +
  theme_bw() +
  scale_colour_manual(values=c(night="black", morning="orange",
                               afternoon="orange", evening="blue")) +
  labs(x="",y="")

enter image description here

  • This is really cool! But I'm unable to replicate it. When I run your code, it comes out looking like this: imgur.com/OtgRhKK – Nate Gardner Oct 6 '17 at 20:52
  • I'm not sure what's causing some of the segments to not be portions of circular arcs. However, I suspect that the very long blue arc is due to a trip that started before midnight on a Saturday and continued past midnight into Sunday. I'll have to think about how to deal with that. You could also change the breaks in scale_y_datetime to cover the full date range of your data. – eipi10 Oct 6 '17 at 21:01
  • I've updated the dataset to include more data. I edited breaks to cover a wider daterange but I'm still ending up with week-long circles and a lot of oddly angled lines. imgur.com/ZAoQTVH – Nate Gardner Oct 6 '17 at 21:18
  • I retried with the same dataset I provided originally and I'm still getting the crosshatch effect, but the week-long circles are gone. What version of R are you using? – Nate Gardner Oct 11 '17 at 22:24
7

This could be achieved relatively straightforwardly with d3. I'll use your data to create a rough template of one basic possible approach. Here's what the result of this approach might look like:

enter image description here

The key ingredient is d3's radial line component that lets us define a line by plotting angle and radius (here's a recent answer showing another spiral graph, that answer started me down the path on this answer).

All we need to do is scale angle and radius to be able to use this effectively (for which we need the first time and last time in the dataset):

var angle = d3.scaleTime()
  .domain([start,end])
  .range([0,Math.PI * 2 * numberWeeks])

var radius = d3.scaleTime()
  .domain([start,end])
  .range([minInnerRadius,maxOuterRadius])

And from there we can create a spiral quite easily, we sample some dates throughout the interval and then pass them to the radial line function:

var spiral = d3.radialLine()
    .curve(d3.curveCardinal)
    .angle(angle)
    .radius(radius);

Here's a quick demonstration of just the spiral covering your time period. I'm assuming a base familiarity with d3 for this answer, so have not touched on a few parts of the code.

Once we have that, it's just a matter of adding sections from the data. The most simple way would be to plainly draw a stroke with some width and color it appropriately. This requires the same as above, but rather than sampling points from the start and end times of the dataset, we just need the start and end times of each datum:

    // append segments on spiral:  
    var segments = g.selectAll()
      .data(data)
      .enter()
      .append("path")
      .attr("d", function(d) {
        return /* sample points and feed to spiral function here */;
      })
      .style("stroke-width", /* appropriate width here */ )
      .style("stroke",function(d) { return /* color logic here */ })

This might look something like this (with data mouseover).

This is just a proof of concept, if you were looking for more control and a nicer look, you could create a polygonal path for each data entry and use both fill & stroke. As is, you'll have to make do with layering strokes to get borders if desired and svg manipulations like line capping options.

Also, as it's d3, and longer timespans may be hard to show all at once, you could show less time but rotate the spiral so that it animates through your time span, dropping off events at the end and creating them in the origin. The actual chart might need to be canvas for this to happen smoothly depending on number of nodes, but to convert to canvas is relatively trivial in this case.


For the sake of filling out the visualization a little with a legend and day labels, this is what I have.

  • I wish I could give the bounty to both the selected answer and this answer. This is very cool. – Nate Gardner May 24 '18 at 16:00
  • No worries, the compliment is plenty. – Andrew Reid May 24 '18 at 19:38

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