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| title: Spearman Correlation Coefficient Metric | |
| emoji: 🤗 | |
| colorFrom: blue | |
| colorTo: red | |
| sdk: gradio | |
| sdk_version: 3.19.1 | |
| app_file: app.py | |
| pinned: false | |
| tags: | |
| - evaluate | |
| - metric | |
| description: >- | |
| The Spearman rank-order correlation coefficient is a measure of the | |
| relationship between two datasets. Like other correlation coefficients, | |
| this one varies between -1 and +1 with 0 implying no correlation. | |
| Positive correlations imply that as data in dataset x increases, so | |
| does data in dataset y. Negative correlations imply that as x increases, | |
| y decreases. Correlations of -1 or +1 imply an exact monotonic relationship. | |
| Unlike the Pearson correlation, the Spearman correlation does not | |
| assume that both datasets are normally distributed. | |
| The p-value roughly indicates the probability of an uncorrelated system | |
| producing datasets that have a Spearman correlation at least as extreme | |
| as the one computed from these datasets. The p-values are not entirely | |
| reliable but are probably reasonable for datasets larger than 500 or so. | |
| # Metric Card for Spearman Correlation Coefficient Metric (spearmanr) | |
| ## Metric Description | |
| The Spearman rank-order correlation coefficient is a measure of the | |
| relationship between two datasets. Like other correlation coefficients, | |
| this one varies between -1 and +1 with 0 implying no correlation. | |
| Positive correlations imply that as data in dataset x increases, so | |
| does data in dataset y. Negative correlations imply that as x increases, | |
| y decreases. Correlations of -1 or +1 imply an exact monotonic relationship. | |
| Unlike the Pearson correlation, the Spearman correlation does not | |
| assume that both datasets are normally distributed. | |
| The p-value roughly indicates the probability of an uncorrelated system | |
| producing datasets that have a Spearman correlation at least as extreme | |
| as the one computed from these datasets. The p-values are not entirely | |
| reliable but are probably reasonable for datasets larger than 500 or so. | |
| ## How to Use | |
| At minimum, this metric only requires a `list` of predictions and a `list` of references: | |
| ```python | |
| >>> spearmanr_metric = evaluate.load("spearmanr") | |
| >>> results = spearmanr_metric.compute(references=[1, 2, 3, 4, 5], predictions=[10, 9, 2.5, 6, 4]) | |
| >>> print(results) | |
| {'spearmanr': -0.7} | |
| ``` | |
| ### Inputs | |
| - **`predictions`** (`list` of `float`): Predicted labels, as returned by a model. | |
| - **`references`** (`list` of `float`): Ground truth labels. | |
| - **`return_pvalue`** (`bool`): If `True`, returns the p-value. If `False`, returns | |
| only the spearmanr score. Defaults to `False`. | |
| ### Output Values | |
| - **`spearmanr`** (`float`): Spearman correlation coefficient. | |
| - **`p-value`** (`float`): p-value. **Note**: is only returned | |
| if `return_pvalue=True` is input. | |
| If `return_pvalue=False`, the output is a `dict` with one value, as below: | |
| ```python | |
| {'spearmanr': -0.7} | |
| ``` | |
| Otherwise, if `return_pvalue=True`, the output is a `dict` containing a the `spearmanr` value as well as the corresponding `pvalue`: | |
| ```python | |
| {'spearmanr': -0.7, 'spearmanr_pvalue': 0.1881204043741873} | |
| ``` | |
| Spearman rank-order correlations can take on any value from `-1` to `1`, inclusive. | |
| The p-values can take on any value from `0` to `1`, inclusive. | |
| #### Values from Popular Papers | |
| ### Examples | |
| A basic example: | |
| ```python | |
| >>> spearmanr_metric = evaluate.load("spearmanr") | |
| >>> results = spearmanr_metric.compute(references=[1, 2, 3, 4, 5], predictions=[10, 9, 2.5, 6, 4]) | |
| >>> print(results) | |
| {'spearmanr': -0.7} | |
| ``` | |
| The same example, but that also returns the pvalue: | |
| ```python | |
| >>> spearmanr_metric = evaluate.load("spearmanr") | |
| >>> results = spearmanr_metric.compute(references=[1, 2, 3, 4, 5], predictions=[10, 9, 2.5, 6, 4], return_pvalue=True) | |
| >>> print(results) | |
| {'spearmanr': -0.7, 'spearmanr_pvalue': 0.1881204043741873 | |
| >>> print(results['spearmanr']) | |
| -0.7 | |
| >>> print(results['spearmanr_pvalue']) | |
| 0.1881204043741873 | |
| ``` | |
| ## Limitations and Bias | |
| ## Citation | |
| ```bibtex | |
| @book{kokoska2000crc, | |
| title={CRC standard probability and statistics tables and formulae}, | |
| author={Kokoska, Stephen and Zwillinger, Daniel}, | |
| year={2000}, | |
| publisher={Crc Press} | |
| } | |
| @article{2020SciPy-NMeth, | |
| author = {Virtanen, Pauli and Gommers, Ralf and Oliphant, Travis E. and | |
| Haberland, Matt and Reddy, Tyler and Cournapeau, David and | |
| Burovski, Evgeni and Peterson, Pearu and Weckesser, Warren and | |
| Bright, Jonathan and {van der Walt}, St{\'e}fan J. and | |
| Brett, Matthew and Wilson, Joshua and Millman, K. Jarrod and | |
| Mayorov, Nikolay and Nelson, Andrew R. J. and Jones, Eric and | |
| Kern, Robert and Larson, Eric and Carey, C J and | |
| Polat, {\.I}lhan and Feng, Yu and Moore, Eric W. and | |
| {VanderPlas}, Jake and Laxalde, Denis and Perktold, Josef and | |
| Cimrman, Robert and Henriksen, Ian and Quintero, E. A. and | |
| Harris, Charles R. and Archibald, Anne M. and | |
| Ribeiro, Ant{\^o}nio H. and Pedregosa, Fabian and | |
| {van Mulbregt}, Paul and {SciPy 1.0 Contributors}}, | |
| title = {{{SciPy} 1.0: Fundamental Algorithms for Scientific | |
| Computing in Python}}, | |
| journal = {Nature Methods}, | |
| year = {2020}, | |
| volume = {17}, | |
| pages = {261--272}, | |
| adsurl = {https://rdcu.be/b08Wh}, | |
| doi = {10.1038/s41592-019-0686-2}, | |
| } | |
| ``` | |
| ## Further References | |
| *Add any useful further references.* | |