Let $T_{f}$ be a circle homeomorphism with two break points $a_{b},c_{b}$ andirrational rotation number $\varrho_{f}$. Suppose that the derivative $Df$ ofits lift $f$ is absolutely continuous on every connected interval of the set$S^{1}\backslash\{a_{b},c_{b}\}$, that $DlogDf \in L^{1}$ and the product ofthe jump ratios of $ Df $ at the break points is nontrivial, i.e.$\frac{Df_{-}(a_{b})}{Df_{+}(a_{b})}\frac{Df_{-}(c_{b})}{Df_{+}(c_{b})}\neq1$.We prove that the unique $T_{f}$- invariant probability measure $\mu_{f}$ isthen singular with respect to Lebesgue measure $l$ on $S^{1}$.
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