From f1e5741d03d181d7417dcf06e40d81d5e0fd5434 Mon Sep 17 00:00:00 2001
From: Yuchen Pei <me@ypei.me>
Date: Thu, 3 Jan 2019 09:14:14 +0100
Subject: corrected some attributions

---
 posts/2018-12-02-lime-shapley.md | 10 ++++++----
 1 file changed, 6 insertions(+), 4 deletions(-)

(limited to 'posts/2018-12-02-lime-shapley.md')

diff --git a/posts/2018-12-02-lime-shapley.md b/posts/2018-12-02-lime-shapley.md
index a73d32e..c78a1e3 100644
--- a/posts/2018-12-02-lime-shapley.md
+++ b/posts/2018-12-02-lime-shapley.md
@@ -6,7 +6,7 @@ comments: true
 ---
 
 In this post I explain LIME (Ribeiro et. al. 2016), the Shapley values
-(Shapley, 1953) and the SHAP values (Lundberg-Lee, 2017).
+(Shapley, 1953) and the SHAP values (Strumbelj-Kononenko, 2014; Lundberg-Lee, 2017).
 
 __Acknowledgement__. Thanks to Josef Lindman Hörnlund for bringing the LIME
 and SHAP papers to my attention. The research was done while working at KTH 
@@ -247,9 +247,11 @@ Plugging this back into (6) we get the desired result. $\square$
 SHAP
 ----
 
-The SHAP paper (Lundberg-Lee 2017) is not clear in its definition of the
-\"SHAP values\" and its relation to LIME, so the following is my
-interpretation of their interpretation model.
+The paper that coined the term \"SHAP values\" (Lundberg-Lee 2017) 
+is not clear in its definition of the \"SHAP values\" and its 
+relation to LIME, so the following is my
+interpretation of their interpretation model, which coincide with a
+model studied in Strumbelj-Kononenko 2014.
 
 Recall that we want to calculate feature contributions to a model $f$ at
 a sample $x$.
-- 
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