# Finding increases from 'baseline' in the graph, not sure how to do

I want to write an algorithm that spits out the points highlighted by arrows. I've tried using a second derivative but it returns a similar plot to the one above and not sure how to use it.

Hi, sorry about that, I don't want the peaks, I want the point where the graph starts to increase - ie I want the point where the gradient changes from ~0 to something larger, does that make sense

Example data is below.

``````df = structure(list(X1 = c("2729", "2730", "2731", "2732", "2733",
"2734", "2735", "2736", "2737", "2738", "2739", "2740", "2741",
"2742", "2743", "2744", "2745", "2746", "2747", "2748", "2749",
"2750", "2751", "2752", "2753", "2754", "2755", "2756", "2757",
"2758", "2759", "2760", "2761", "2762", "2763", "2764", "2765",
"2766", "2767", "2768", "2769", "2770", "2771", "2772", "2773",
"2774", "2775", "2776", "2777", "2778", "2779", "2780", "2781",
"2782", "2783", "2784", "2785", "2786", "2787", "2788", "2789",
"2790", "2791", "2792", "2793", "2794", "2795", "2796", "2797",
"2798", "2799", "2800", "2801", "2802", "2803", "2804", "2805",
"2806", "2807", "2808", "2809", "2810", "2811", "2812", "2813",
"2814", "2815", "2816", "2817", "2818", "2819", "2820", "2821",
"2822", "2823", "2824", "2825", "2826", "2827", "2828", "2829",
"2830", "2831", "2832", "2833", "2834", "2835", "2836", "2837",
"2838", "2839", "2840", "2841", "2842", "2843", "2844", "2845",
"2846", "2847", "2848", "2849", "2850", "2851", "2852", "2853",
"2854", "2855", "2856", "2857", "2858", "2859", "2860", "2861",
"2862", "2863", "2864", "2865", "2866", "2867", "2868", "2869",
"2870", "2871", "2872", "2873", "2874", "2875", "2876", "2877",
"2878", "2879", "2880", "2881", "2882", "2883", "2884", "2885",
"2886", "2887", "2888", "2889", "2890", "2891", "2892", "2893",
"2894", "2895", "2896", "2897", "2898", "2899", "2900", "2901",
"2902", "2903", "2904", "2905", "2906", "2907", "2908", "2909",
"2910", "2911", "2912", "2913", "2914", "2915", "2916", "2917",
"2918", "2919", "2920", "2921", "2922", "2923", "2924", "2925",
"2926", "2927", "2928", "2929", "2930", "2931", "2932", "2933",
"2934", "2935", "2936", "2937", "2938", "2939", "2940", "2941",
"2942", "2943", "2944", "2945", "2946", "2947", "2948", "2949",
"2950", "2951", "2952", "2953", "2954", "2955", "2956", "2957",
"2958", "2959", "2960", "2961", "2962", "2963", "2964", "2965",
"2966", "2967", "2968", "2969", "2970", "2971", "2972", "2973",
"2974", "2975", "2976", "2977", "2978", "2979", "2980", "2981",
"2982", "2983", "2984", "2985", "2986", "2987", "2988", "2989",
"2990", "2991", "2992", "2993", "2994", "2995", "2996", "2997",
"2998", "2999", "3000", "3001", "3002", "3003", "3004", "3005",
"3006", "3007", "3008", "3009", "3010", "3011", "3012", "3013",
"3014", "3015", "3016", "3017", "3018", "3019", "3020", "3021",
"3022", "3023", "3024", "3025", "3026", "3027", "3028", "3029",
"3030", "3031", "3032", "3033", "3034", "3035", "3036", "3037",
"3038", "3039", "3040", "3041", "3042", "3043", "3044", "3045",
"3046", "3047", "3048", "3049", "3050", "3051", "3052", "3053",
"3054", "3055", "3056", "3057", "3058", "3059", "3060", "3061",
"3062", "3063", "3064", "3065", "3066", "3067", "3068", "3069",
"3070", "3071", "3072", "3073", "3074", "3075", "3076", "3077",
"3078", "3079", "3080", "3081", "3082", "3083", "3084", "3085",
"3086", "3087", "3088", "3089", "3090", "3091", "3092", "3093",
"3094", "3095", "3096", "3097", "3098", "3099", "3100", "3101",
"3102", "3103", "3104", "3105", "3106", "3107", "3108", "3109",
"3110", "3111", "3112", "3113", "3114", "3115", "3116", "3117",
"3118", "3119", "3120", "3121", "3122", "3123", "3124", "3125",
"3126", "3127", "3128", "3129", "3130", "3131", "3132", "3133",
"3134", "3135", "3136", "3137", "3138", "3139", "3140", "3141",
"3142", "3143", "3144", "3145", "3146", "3147", "3148", "3149",
"3150", "3151", "3152", "3153", "3154", "3155", "3156", "3157",
"3158", "3159", "3160", "3161", "3162", "3163", "3164", "3165",
"3166", "3167", "3168", "3169", "3170", "3171", "3172", "3173",
"3174", "3175", "3176", "3177", "3178", "3179", "3180", "3181",
"3182", "3183", "3184", "3185", "3186", "3187", "3188", "3189",
"3190", "3191", "3192", "3193", "3194", "3195", "3196", "3197",
"3198", "3199", "3200", "3201", "3202", "3203", "3204", "3205",
"3206", "3207", "3208", "3209", "3210", "3211", "3212", "3213",
"3214", "3215", "3216", "3217", "3218", "3219", "3220", "3221",
"3222", "3223", "3224", "3225", "3226", "3227", "3228", "3229",
"3230", "3231", "3232", "3233", "3234", "3235", "3236", "3237",
"3238", "3239", "3240", "3241", "3242", "3243", "3244", "3245",
"3246", "3247", "3248", "3249", "3250", "3251", "3252", "3253",
"3254", "3255", "3256", "3257", "3258", "3259", "3260", "3261",
"3262", "3263", "3264", "3265", "3266", "3267", "3268", "3269",
"3270", "3271", "3272", "3273", "3274", "3275", "3276", "3277",
"3278", "3279", "3280", "3281", "3282", "3283", "3284", "3285",
"3286", "3287", "3288", "3289", "3290", "3291", "3292", "3293",
"3294", "3295", "3296", "3297", "3298", "3299", "3300", "3301",
"3302", "3303", "3304", "3305", "3306", "3307", "3308", "3309",
"3310", "3311", "3312", "3313", "3314", "3315", "3316", "3317",
"3318", "3319", "3320", "3321", "3322", "3323", "3324", "3325",
"3326", "3327", "3328", "3329", "3330", "3331", "3332", "3333",
"3334", "3335", "3336", "3337", "3338", "3339", "3340", "3341",
"3342", "3343", "3344", "3345", "3346", "3347", "3348", "3349",
"3350", "3351", "3352", "3353", "3354", "3355", "3356", "3357",
"3358", "3359", "3360", "3361", "3362", "3363", "3364", "3365",
"3366", "3367", "3368", "3369", "3370", "3371", "3372", "3373",
"3374", "3375", "3376", "3377", "3378", "3379", "3380", "3381",
"3382", "3383", "3384", "3385", "3386", "3387", "3388", "3389",
"3390", "3391", "3392", "3393", "3394", "3395", "3396", "3397",
"3398", "3399", "3400", "3401", "3402", "3403", "3404", "3405",
"3406", "3407", "3408", "3409", "3410", "3411", "3412", "3413",
"3414", "3415", "3416", "3417", "3418", "3419", "3420", "3421",
"3422", "3423", "3424", "3425", "3426", "3427", "3428", "3429",
"3430", "3431", "3432", "3433", "3434", "3435", "3436", "3437",
"3438", "3439", "3440", "3441", "3442", "3443", "3444", "3445"
), X2 = c(-0.00385000000001254, -0.0154500000000484, -0.0277600000000007,
-0.0154500000000279, -0.0386000000000704, -0.0154500000000329,
-0.0115500000000053, 2.5238009638656e-15, -0.00385000000000757,
3.60475000000867, -0.470850000000881, -0.347350000000663, -0.173700000000328,
-0.139699999999998, -0.096500000000187, -0.0617500000001111,
-0.0579000000001016, -0.0424500000000768, -0.050150000000105,
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-0.0270000000000563, -0.0309000000000539, -0.0231500000000468,
-0.0270500000000538, -0.00775000000002209, -0.0193000000000404,
-0.0131199999999931, 0.219999999999842, 0.0579000000001427, -0.061750000000126,
-0.0617500000002055, -0.0309000000000726, -0.050150000000105,
-0.042450000000091, -0.0193000000000293, -0.0309000000000144,
-0.0115500000000196, -0.0116000000000154, -0.0154500000000366,
-0.00385000000000946, -0.0193000000000305, -0.00390000000000946,
-0.00390000000000639, -0.00771000000000015, -0.000789999999999225,
-4.97400384373025e-15, -0.00619000000000085, -0.0116000000000265,
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-0.0116000000000203, -0.011550000000014, 0.00385000000001136,
-0.00230999999999795, 2.86419210237446e-15, -0.00230999999999954,
-0.00770000000002508, -0.00770000000001703, -0.00390000000000449,
-0.0085000000000008, -0.0193000000000529, -8.05101707233625e-15,
-0.00385000000001751, -0.0146699999999988, -0.00619000000000085,
-0.0116000000000265, 0.00153999999999996, 0.00385000000000546,
-0.00231000000000233, -0.000780000000000314, -0.00230999999999884,
0.0015400000000021, -8.05101707233625e-15, -0.00848000000000013,
-0.00385000000001751, -0.00775000000003729, -0.00769999999999792,
-1.1787959787484e-15, -0.00384999999999692, 0.00385000000001136,
-0.00384999999999762, 0.00385000000000639, -0.00385000000001161,
-0.000440000000001542, -0.00390000000000639, -0.000769999999999981,
0, -0.0154500000000091, -0.0077500000000059, -0.0154500000000335,
-0.0115500000000165, -0.00385000000000567, -0.00311000000000092,
0.0116000000000272, -0.00230999999999994, 0.0116000000000172,
0.00770000000001277, -0.00385000000000377, -0.00385000000001254,
0.00385000000001136, -0.00385000000000411, -0.0038499999999997,
-0.0116000000000215, -0.0154300000000006, -6.15348059644161e-15,
-0.00849999999999866, -0.0015500000000003, 0.00154000000000174,
-3.07674029821757e-15, -0.0115500000000345, -0.0115500000000165,
-6.15348059644161e-15, -0.00385000000002247, 0.0077000000000059,
-0.00385000000001254, -0.0115500000000315, -0.0154500000000107,
-0.0154500000000229, -0.0309000000000733, -1.65190000000256,
-0.258600000000477, -0.111900000000204, -0.0640499999999989,
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-0.038600000000117, -0.050200000000097, -0.0309000000000527,
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0.00385000000000639, -0.941700000001459, -0.169850000000308,
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-0.0772000000001527, -0.0579000000001345, -0.0656000000001255,
-0.0540500000001704, -0.0386000000000716, -0.0270500000000663,
-0.0116000000000284, -0.0216200000000043, -0.00770000000001206,
-0.0308500000000552, -0.0115500000000265, -2.4190463576414e-14,
-0.00770000000003006, -0.0115900000000011, -0.0231500000000985,
-0.0193000000000293, -0.033979999999999, -0.00775000000002643,
-0.0478400000000022, -0.0231500000000412, -0.019300000000043,
-0.00233000000000134, -0.00390000000002501, 0.00154999999999958,
0.00384999999999991, 0.0077000000000059, -0.00770000000003193,
-0.0200899999999983, -0.0193000000000423, -0.0347000000000634,
-0.0540000000000927, -0.0733500000001364, -0.0501500000001637,
-0.0424500000000886, -0.050200000000087, -0.0308500000000459,
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-0.0579000000001085, -0.0733500000001314, -0.0386000000000697,
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0.00385000000000881, 0.000769999999999982, 0.0115500000000203,
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-0.00385000000000567, -0.0309000000001234, -0.0347500000000728,
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0.274000000000822, 0.463150000000818, 1.03820000000353, 0.636800000000563,
-0.13663, -0.87225000000281, 0.644550000001354, -0.0579000000003174,
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0.00390000000001402, 0.00153999999999996, -0.00307999999999993,
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0.00153999999999892, -0.000779999999999603, -2.5238009638656e-15,
0.00465000000000089, -0.00770000000001703, -2.91289464345889e-16,
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-0.019300000000043, -0.0115899999999989, -0.0115900000000011,
-0.00770000000003258, 0, 0.00390000000000331, 0.0193000000000281,
0.00385000000002044, 0.00770000000002145, 0.00770000000000148,
0.0077000000000078, 0, 0.00308000000000135, -6.15348059644161e-15,
-0.015450000000036, -0.0309000000000726, -0.00385000000001254,
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-0.023150000000093, -0.0154500000000348, -0.0424500000000737,
-0.019300000000043, -0.0308500000000125, -0.0309000000001054,
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0.0154500000000168, 0.00775000000000384, 0.0115500000000154,
0.00769999999999875, 1.89760393249092e-15, 0.00231999999999957,
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• What's the rule for where you drew the arrows? Please describe in words exactly what you are trying to detect. There are already a few questions you can find about "finding peaks" in data. But i'm not sure how your question is different than that. Feb 10, 2020 at 5:39
• Do you want the point just before the arrow? Is the baseline still considered `0` after it gets noisy(`x >2400`) Feb 10, 2020 at 6:06
• Hi, sorry about that, I don't want the peaks, I want the point where the graph starts to increase - ie I want the point where the gradient changes from ~0 to something larger, does that make sense Feb 10, 2020 at 20:22
• @mexicanseafood, my answer below does answer that question. It selects when the gradient is more than one standard deviation above the distribution of gradients in the curve. If you agree, please accept my answer. Feb 28, 2020 at 6:33

As others have said, it is not clear what you are looking for. specifically, it's not clear how high above "baseline" is too high.

Here's a shot at it:

``````df_prime <- df\$X2[-1] - df\$X2[-length(df\$X2)]
large_rise <- which(df_prime > sd(df_prime) & df\$X2[-length(df\$X2)] > -sd(df\$X2))
df\$X1[large_rise]
``````

It's difficult to know from the question, but aren't you just looking for something like this?

``````spikes <- as.numeric(df\$X1[df\$X2 > 0.1])
spikes <- spikes[which(diff(c(0, spikes)) > 3)]
spikes
#> [1] 2738 2758 2984 2994 3126 3139 3190 3260 3273 3309 3316 3363 3377
``````

So, for example if you did

``````plot(df\$X1, df\$X2, type = "l")
points(spikes, rep(1, length(spikes)), col="red")
``````

You would get