I need to convert a csv file into a hierarchical JSON object (preferably using Python). I thought that the script I have (below) does a correct job of converting to JSON, but the JavaScript library I'm feeding the JSON data to (D3.js) doesn't work with it.

The csv file looks like this:

subject,branch,book,chapter,Encode ID,Level 1,Level 2,Level 3,Level 4
MAT,TRI,CK-12 Trigonometry - Second Edition,Right Triangles and an Introduction to Trigonometry,MAT.TRI.000,Right Triangles and an Introduction to Trigonometry,,,
MAT,TRI,CK-12 Trigonometry - Second Edition,Right Triangles and an Introduction to Trigonometry,MAT.TRI.004,,The Pythagorean Theorem,,
MAT,TRI,CK-12 Trigonometry - Second Edition,Right Triangles and an Introduction to Trigonometry,MAT.TRI.005,,,The Pythagorean Theorem,
MAT,TRI,CK-12 Trigonometry - Second Edition,Right Triangles and an Introduction to Trigonometry,MAT.TRI.006,,,Pythagorean Triples,
MAT,TRI,CK-12 Trigonometry - Second Edition,Right Triangles and an Introduction to Trigonometry,MAT.TRI.007,,,Converse of the Pythagorean Theorem,
MAT,TRI,CK-12 Trigonometry - Second Edition,Right Triangles and an Introduction to Trigonometry,MAT.TRI.008,,,The Distance Formula,
MAT,TRI,CK-12 Trigonometry - Second Edition,Right Triangles and an Introduction to Trigonometry,MAT.TRI.009,,Special Right Triangles,,

Right now, I have the following code the recursively builds the hierarchical array:

import csv
import json
import random


# open up the csv file
f = open('/path/to/file','rU')
c = csv.DictReader(f)

# lists for keeping track of what subjects and branches I've already iterated over
subject_list = []
branch_list = []
lev1_list = []
lev2_list = []
lev3_list = []
lev4_list = []

# iterate through file
i = 0
for row in c:
    if i == 0:
        subject = row['subject']
        branch = row['branch']
        if len(row['Level 1']) > 0:
            lev1 = row['Level 1']
            lev2 = None
        if len(row['Level 2']) > 0:
            lev2 = row['Level 2']
            lev2 = None
        if len(row['Level 3']) > 0:
            lev3 = row['Level 3']
            lev3 = None

        if row['subject'] != subject:

            # add all branches to this subject

            # set current subject
            subject = row['subject']

        if row['branch'] != branch:
            # add all concepts to this branch

            # empty lev1_list
            lev1_list = []

            # set new branch
            branch = row['branch']

        if len(row['Level 1']) > 0 and row['Level 1'] != lev1:
            # print lev1
            # add all level 2 concepts to this level 1
            #print lev1
            #empty lev2_list
            lev2_list = []

            #lev1_list.append(row['Level 1'])
            lev1 = row['Level 1']

        if len(row['Level 2']) > 0 and row['Level 2'] != lev3:
            #print lev2
            #print lev3_list
            # add all level 3 concepts to this level 2
            if lev2 is not None:

            # empty lev3_list
            lev3_list = []

            # lev2_list.append(row['Level 2'])
            lev2 = row['Level 2']

        if len(row['Level 3']) > 0 and row['Level 3'] != lev3:
            # print lev3
            # add all level 4 concepts to this level 4
            # lev3_list.append({'name':lev3,'type':'concept','level':3})

            # empty level 4 concepts
            # lev4_list = []

            # add new level 3
            if lev3 is not None:
            lev3 = row['Level 3']

        #if row['Level 4'] is not None and row['Level 4'] is not lev4:
        #   lev4_list.append({'name':lev4,'type':'concept','level':4})
        #   lev4 = row['Level 4']

    i += 1



subject_dict = {'name':subject,'type':'subject','children':branch_list}

#json_list= json.dumps(subject_list)
json_list = json.dumps(subject_dict)

f = open('/Users/thaymore/Sites/d3/data/trig_map.json','wb')

What this gets me right now is something like this:

{"type": "subject", "name": "MAT", "children": [{"type": "branch", "name": "TRI", "children": [{"children": [{"children": [{"size": 40, "type": "concept", "name": "The Pythagorean Theorem", "level": 3}, {"size": 19, "type": "concept", "name": "Pythagorean Triples", "level": 3}, {"size": 68, "type": "concept", "name": "Converse of the Pythagorean Theorem", "level": 3}], "type": "concept", "name": "The Pythagorean Theorem", "level": 2}, {"children": [{"size": 28, "type": "concept", "name": "The Distance Formula", "level": 3}, {"size": 49, "type": "concept", "name": "Special Right Triangle #1: Isosceles Right Triangle", "level": 3}, {"size": 33, "type": "concept", "name": "Special Right Triangle #2: 30-60-90 Triangle", "level": 3}], "type": "concept", "name": "Special Right Triangles", "level": 2}, {"children": [{"size": 18, "type": "concept", "name": "Using Special Right Triangle Ratios", "level": 3}, {"size": 49, "type": "concept", "name": "The Sine, Cosine, and Tangent Functions", "level": 3}], "type": "concept", "name": "Basic Trigonometric Functions", "level": 2}, {"children": [{"size": 100, "type": "concept", "name": "Secant, Cosecant, and Cotangent Functions", "level": 3}, {"size": 73, "type": "concept", "name": "Solving Right Triangles", "level": 3}, {"size": 93, "type": "concept", "name": "Inverse Trigonometric Functions", "level": 3}, {"size": 88, "type": "concept", "name": "Finding the Area of a Triangle", "level": 3}, {"size": 6, "type": "concept", "name": "Angles of Elevation and Depression", "level": 3}, {"size": 3, "type": "concept", "name": "Right Triangles and Bearings", "level": 3}], "type": "concept", "name": "Solving Right Triangles", "level": 2}, {"children": [{"size": 68, "type": "concept", "name": "Other Applications of Right Triangles", "level": 3}, {"size": 92, "type": "concept", "name": "Angles of Rotation in Standard Position", "level": 3}], "type": "concept", "name": "Measuring Rotation", "level": 2}, {"children": [{"size": 14, "type": "concept", "name": "Coterminal Angles", "level": 3}, {"size": 68, "type": "concept", "name": "Trigonometric Functions of Angles in Standard Position", "level": 3}], "type": "concept", "name": "Applying Trig Functions to Angles of Rotation", "level": 2}, {"children": [{"size": 61, "type": "concept", "name": "The Unit Circle", "level": 3}, {"size": 95, "type": "concept", "name": "Reference Angles and Angles in the Unit Circle", "level": 3}, {"size": 11, "type": "concept", "name": "Trigonometric Functions of Negative Angles", "level": 3}, {"size": 45, "type": "concept", "name": "Trigonometric Functions of Angles Greater than 360 Degrees", "level": 3}], "type": "concept", "name": "Trigonometric Functions of Any Angle", "level": 2}], "type": "concept", "name": "Right Triangles and an Introduction to Trigonometry", "level": 1}, {"children": [{"children": [{"size": 20, "type": "concept", "name": "Using a Calculator to Find Values", "level": 3}, {"size": 25, "type": "concept", "name": "Reciprocal identities", "level": 3}, {"size": 40, "type": "concept", "name": "Domain, Range, and Signs of Trig Functions", "level": 3}, {"size": 97, "type": "concept", "name": "Quotient Identities", "level": 3}, {"size": 18, "type": "concept", "name": "Cofunction Identities and Reflection", "level": 3}], "type": "concept", "name": "Relating Trigonometric Functions", "level": 2}, {"children": [{"size": 35, "type": "concept", "name": "Pythagorean Identities", "level": 3}, {"size": 95, "type": "concept", "name": "Understanding Radian Measure", "level": 3}, {"size": 30, "type": "concept", "name": "Critial Angles in Radians", "level": 3}, {"size": 16, "type": "concept", "name": "Converting Any Degree to Radians", "level": 3}, {"size": 25, "type": "concept", "name": "The Six Trig Functions and Radians", "level": 3}], "type": "concept", "name": "Radian Measure", "level": 2}, {"children": [{"size": 19, "type": "concept", "name": "Check the Mode", "level": 3}, {"size": 63, "type": "concept", "name": "Rotations", "level": 3}, {"size": 33, "type": "concept", "name": "Length of Arc", "level": 3}, {"size": 54, "type": "concept", "name": "Area of a Sector", "level": 3}, {"size": 6, "type": "concept", "name": "Length of a Chord", "level": 3}], "type": "concept", "name": "Applications of Radian Measure", "level": 2}, {"children": [{"size": 71, "type": "concept", "name": "Angular Velocity", "level": 3}, {"size": 16, "type": "concept", "name": "The Sine Graph", "level": 3}, {"size": 65, "type": "concept", "name": "The Cosine Graph", "level": 3}, {"size": 32, "type": "concept", "name": "The Tangent Graph", "level": 3}, {"size": 93, "type": "concept", "name": "The Three Reciprocal Functions", "level": 3}, {"size": 30, "type": "concept", "name": "Cotangent", "level": 3}, {"size": 4, "type": "concept", "name": "Cosecant", "level": 3}], "type": "concept", "name": "Circular Functions of Real Numbers", "level": 2}, {"children": [{"size": 100, "type": "concept", "name": "Secant", "level": 3}, {"size": 40, "type": "concept", "name": "Vertical Translations", "level": 3}], "type": "concept", "name": "Translating Sine and Cosine Functions", "level": 2}, {"children": [{"size": 58, "type": "concept", "name": "Horizontal Translations or Phase Shifts", "level": 3}, {"size": 76, "type": "concept", "name": "Amplitude", "level": 3}, {"size": 91, "type": "concept", "name": "Period and Frequency", "level": 3}], "type": "concept", "name": "Amplitude, Period and Frequency", "level": 2}, {"children": [{"size": 78, "type": "concept", "name": "Combining Amplitude and Period", "level": 3}, {"size": 12, "type": "concept", "name": "The Generalized Equations", "level": 3}, {"size": 22, "type": "concept", "name": "Drawing Sketches/Identifying Transformations from the Equation", "level": 3}], "type": "concept", "name": "General Sinusoidal Graphs", "level": 2}], "type": "concept", "name": "Graphing Trigonometric Functions - 2nd edition", "level": 1}, {"children": [{"children": [{"size": 81, "type": "concept", "name": "Writing the Equation from a Sketch", "level": 3}, {"size": 60, "type": "concept", "name": "Tangent and Cotangent", "level": 3}, {"size": 27, "type": "concept", "name": "Secant and Cosecant", "level": 3}], "type": "concept", "name": "Graphing Tangent, Cotangent, Secant, and Cosecant", "level": 2}, {"children": [{"size": 62, "type": "concept", "name": "Graphing Calculator Note", "level": 3}, {"size": 20, "type": "concept", "name": "Quotient Identity", "level": 3}, {"size": 15, "type": "concept", "name": "Reciprocal Identities", "level": 3}, {"size": 28, "type": "concept", "name": "Pythagorean Identity", "level": 3}, {"size": 28, "type": "concept", "name": "Even and Odd Identities", "level": 3}], "type": "concept", "name": "Fundamental Identities", "level": 2}, {"children": [{"size": 24, "type": "concept", "name": "Cofunction Identities", "level": 3}, {"size": 91, "type": "concept", "name": "Working with Trigonometric Identities", "level": 3}], "type": "concept", "name": "Proving Identities", "level": 2}, {"children": [{"size": 59, "type": "concept", "name": "Technology Note", "level": 3}, {"size": 26, "type": "concept", "name": "Simplifying Trigonometric Expressions", "level": 3}, {"size": 94, "type": "concept", "name": "Solving Trigonometric Equations", "level": 3}, {"size": 49, "type": "concept", "name": "Solving Trigonometric Equations Using Factoring", "level": 3}], "type": "concept", "name": "Solving Trigonometric Equations", "level": 2}, {"children": [{"size": 25, "type": "concept", "name": "Solving Trigonometric Equations Using the Quadratic Formula", "level": 3}, {"size": 11, "type": "concept", "name": "Sum and Difference Formulas: cosine", "level": 3}, {"size": 30, "type": "concept", "name": "Using the Sum and Difference Identities of cosine", "level": 3}, {"size": 75, "type": "concept", "name": "Sum and Difference Identities: sine", "level": 3}, {"size": 94, "type": "concept", "name": "Sum and Difference Identities: Tangent", "level": 3}, {"size": 22, "type": "concept", "name": "Using the Sum and Difference Identities to Verify Other Identities", "level": 3}], "type": "concept", "name": "Sum and Difference Identities", "level": 2}, {"children": [{"size": 15, "type": "concept", "name": "Solving Equations with the Sum and Difference Formulas", "level": 3}, {"size": 88, "type": "concept", "name": "Deriving the Double Angle Identities", "level": 3}, {"size": 42, "type": "concept", "name": "Applying the Double Angle Identities", "level": 3}], "type": "concept", "name": "Double Angle Identities", "level": 2}, {"children": [{"size": 13, "type": "concept", "name": "Solving Equations with Double Angle Identities", "level": 3}, {"size": 36, "type": "concept", "name": "Deriving the Half Angle Formulas", "level": 3}], "type": "concept", "name": "Half-Angle Identities", "level": 2}], "type": "concept", "name": "Trigonometric Identities and Equations - 2nd edition", "level": 1}, {"children": [{"children": [{"size": 100, "type": "concept", "name": "Solving Trigonometric Equations Using Half Angle Formulas", "level": 3}, {"size": 93, "type": "concept", "name": "Sum to Product Formulas for Sine and Cosine", "level": 3}, {"size": 71, "type": "concept", "name": "Product to Sum Formulas for Sine and Cosine", "level": 3}, {"size": 53, "type": "concept", "name": "Solving Equations with Product and Sum Formulas", "level": 3}, {"size": 45, "type": "concept", "name": "Triple-Angle Formulas and Beyond", "level": 3}, {"size": 18, "type": "concept", "name": "Linear Combinations", "level": 3}], "type": "concept", "name": "Products, Sums, Linear Combinations, and Applications", "level": 2}, {"children": [{"size": 73, "type": "concept", "name": "Applications & Technology", "level": 3}, {"size": 54, "type": "concept", "name": "Defining the Inverse of the Trigonometric Ratios", "level": 3}, {"size": 15, "type": "concept", "name": "Exact Values for Inverse Sine, Cosine, and Tangent", "level": 3}], "type": "concept", "name": "Basic Inverse Trigonometric Functions", "level": 2}, {"children": [{"size": 1, "type": "concept", "name": "Finding Inverses Algebraically", "level": 3}, {"size": 93, "type": "concept", "name": "Finding the Inverse by Mapping", "level": 3}], "type": "concept", "name": "Graphing Inverse Trigonometric Functions", "level": 2}, {"children": [{"size": 79, "type": "concept", "name": "Finding the Inverse of the Trigonometric Functions", "level": 3}, {"size": 29, "type": "concept", "name": "Composing Trig Functions and their Inverses", "level": 3}, {"size": 19, "type": "concept", "name": "Composing Trigonometric Functions", "level": 3}, {"size": 53, "type": "concept", "name": "Inverse Reciprocal Functions", "level": 3}, {"size": 28, "type": "concept", "name": "Composing Inverse Reciprocal Trig Functions", "level": 3}], "type": "concept", "name": "Inverse Trigonometric Properties", "level": 2}], "type": "concept", "name": "Inverse Trigonometric Functions - 2nd edition", "level": 1}, {"children": [{"children": [], "type": "concept", "name": "Applications & Models", "level": 2}, {"children": [{"size": 42, "type": "concept", "name": "Trigonometry in Terms of Algebra", "level": 3}, {"size": 38, "type": "concept", "name": "Derive the Law of Cosines", "level": 3}, {"size": 82, "type": "concept", "name": "Case #1:  Finding the Side of an Oblique Triangle", "level": 3}, {"size": 68, "type": "concept", "name": "Case #2:  Finding any Angle of a Triangle", "level": 3}], "type": "concept", "name": "The Law of Cosines", "level": 2}, {"children": [{"size": 20, "type": "concept", "name": "Identify Accurate Drawings of General Triangles", "level": 3}, {"size": 90, "type": "concept", "name": "Find the Area Using Three Sides:  Heron\u2019s Formula", "level": 3}, {"size": 7, "type": "concept", "name": "Heron\u2019s Formula:", "level": 3}], "type": "concept", "name": "Area of a Triangle", "level": 2}, {"children": [{"size": 21, "type": "concept", "name": "Finding a Part of the Triangle, Given the Area", "level": 3}, {"size": 58, "type": "concept", "name": "Deriving the Law of Sines", "level": 3}, {"size": 15, "type": "concept", "name": "AAS (Angle-Angle-Side)", "level": 3}, {"size": 41, "type": "concept", "name": "ASA (Angle-Side-Angle)", "level": 3}], "type": "concept", "name": "The Law of Sines", "level": 2}, {"children": [{"size": 87, "type": "concept", "name": "Solving Triangles", "level": 3}, {"size": 31, "type": "concept", "name": "Possible Triangles with SSA", "level": 3}, {"size": 45, "type": "concept", "name": "Using the Law of Sines", "level": 3}], "type": "concept", "name": "The Ambiguous Case", "level": 2}, {"children": [{"size": 40, "type": "concept", "name": "Using the Law of Cosines", "level": 3}, {"size": 2, "type": "concept", "name": "Summary of Triangle Techniques", "level": 3}, {"size": 18, "type": "concept", "name": "Using the Law of Cosines", "level": 3}], "type": "concept", "name": "General Solutions of Triangles", "level": 2}, {"children": [{"size": 42, "type": "concept", "name": "Using the Law of Sines", "level": 3}, {"size": 6, "type": "concept", "name": "Directed Line Segments, Equal Vectors, and Absolute Value", "level": 3}, {"size": 60, "type": "concept", "name": "Vector Addition", "level": 3}, {"size": 76, "type": "concept", "name": "Vector Subtraction", "level": 3}], "type": "concept", "name": "Vectors", "level": 2}], "type": "concept", "name": "Triangles and Vectors", "level": 1}]}]}

I think this might technically fit the JSON specs, but the library that I'm trying to feed the JSON data to (D3.js) can't seem to do anything with it. Is it because the order of the elements is out-of-whack (i.e., the "children" element is coming before the "name" element)? Is it something more basic that I'm doing?

(The file whose structure I'm trying to match is located here.)

  • Check if it's the order by switching all the {} / dicts with OrderedDicts and report back. – agf Sep 22 '11 at 19:19
  • What do you mean by "can't seem to do anything with it"? Can't even parse it (for instance, perhaps the extra comma on the end of your example is just causing a parse error), or something more specific? – Zach Snow Sep 22 '11 at 19:25
  • @agf Running Python 2.6 -- is OrderedDict available in that version? – tchaymore Sep 22 '11 at 19:26
  • @ZachSnow The extra comma is there just because I truncated the data. The D3.js library is supposed to be able to convert a JSON object to a hierarchical node layout, which works just fine with the default JSON file I linked to above. However, with my JSON data, it doesn't do anything -- as if it cannot process the data, or returns one "undefined" node. – tchaymore Sep 22 '11 at 19:28
  • To help us validate whether your return output is correct, can you please provide the complete JSON output? It's kind of difficult to determine where you left off before "and so on". – jathanism Sep 22 '11 at 19:29

Wouldn't this work?

import json

f = open('path/to/file','r')

headers = []

for header in f.readline().split(','):

for line in f.readlines():
  lineItems = {}
  for i,item in enumerate(line.split(',')):  
    lineItems[headers[i]] = item


jsonText = json.dumps(arr)

print jsonText

Order of elements is not important for json.

The json you are producing is wrong, though. The example you gave that you are trying to match does not have a "subject" key at the top level. It shows just "name" => "flare", and a list of children. Your script is producing json with a "subject" key.

Instead of

subject_dict = {'name':subject,'type':'subject','children':branch_list}


subject_dict = {'name':subject,'children':branch_list}

I don't know about D3.js, so I can't say if it expects an object that follows one exact structure.

Tip: one good tool to check the structure of json objects is http://jsoneditor.appspot.com. Just paste your string in there and click on "Go to Treeview". It will hellp you find differences between what you have and what you want very easily.


D3 expects the value in JSON to also be in double quotes. so e.g. "level": 3 should be "level" : "3". When you use this data in D3 for calculation it will need to be a number again though so where you use it you can just use +data.xxx.yyy.level instead of data.xxx.yyy.level in the d3 code to turn it into a number.

import csv
import json
file1 = csv.DictReader(open('filename.csv', 'r'))
output =[]
for each in complent:
    row = {}
    row['Id'] = each['Id']
    row['Name'] = each['Name']
    row['Address'] = each['Address']
    row['Mobile'] = each['Mobile']
    row['LandLine'] = each['LandLine']
    row['Email'] = each['Email']


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