<p>This paper investigates functional equations arising from perturbations of Cauchy differences. We study equations of the form <Equation ID="Equ23"> <EquationSource Format="TEX">\( f(x+y)-f(x)-f(y)=B(x,y) \quad \text {or} \quad f(xy)-f(x)f(y) = B(x,y) \)</EquationSource> <EquationSource Format="MATHML"><math display="block"> <mrow> <mi>f</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo>+</mo> <mi>y</mi> <mo stretchy="false">)</mo> <mo>-</mo> <mi>f</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo stretchy="false">)</mo> <mo>-</mo> <mi>f</mi> <mo stretchy="false">(</mo> <mi>y</mi> <mo stretchy="false">)</mo> <mo>=</mo> <mi>B</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo>,</mo> <mi>y</mi> <mo stretchy="false">)</mo> <mspace width="1em" /> <mtext>or</mtext> <mspace width="1em" /> <mi>f</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mi>y</mi> <mo stretchy="false">)</mo> <mo>-</mo> <mi>f</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo stretchy="false">)</mo> <mi>f</mi> <mo stretchy="false">(</mo> <mi>y</mi> <mo stretchy="false">)</mo> <mo>=</mo> <mi>B</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo>,</mo> <mi>y</mi> <mo stretchy="false">)</mo> </mrow> </math></EquationSource> </Equation>where <i>B</i> is a biadditive mapping, and also more general cases where the inhomogeneity depends on unknown functions <Equation ID="Equ24"> <EquationSource Format="TEX">\(\begin{aligned} f(x+y)-f(x)-f(y)&amp;= \alpha x y \\ f(x+y)-f(x)-f(y)&amp;= \alpha (x y)\\ f(x+y)-f(x)-f(y)&amp;= \alpha (x)\alpha (y). \end{aligned}\)</EquationSource> <EquationSource Format="MATHML"><math display="block"> <mrow> <mtable> <mtr> <mtd columnalign="right"> <mrow> <mi>f</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo>+</mo> <mi>y</mi> <mo stretchy="false">)</mo> <mo>-</mo> <mi>f</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo stretchy="false">)</mo> <mo>-</mo> <mi>f</mi> <mo stretchy="false">(</mo> <mi>y</mi> <mo stretchy="false">)</mo> </mrow> </mtd> <mtd columnalign="left"> <mrow> <mo>=</mo> <mi>α</mi> <mi>x</mi> <mi>y</mi> </mrow> </mtd> </mtr> <mtr> <mtd columnalign="right"> <mrow> <mrow /> <mi>f</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo>+</mo> <mi>y</mi> <mo stretchy="false">)</mo> <mo>-</mo> <mi>f</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo stretchy="false">)</mo> <mo>-</mo> <mi>f</mi> <mo stretchy="false">(</mo> <mi>y</mi> <mo stretchy="false">)</mo> </mrow> </mtd> <mtd columnalign="left"> <mrow> <mo>=</mo> <mi>α</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mi>y</mi> <mo stretchy="false">)</mo> </mrow> </mtd> </mtr> <mtr> <mtd columnalign="right"> <mrow> <mrow /> <mi>f</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo>+</mo> <mi>y</mi> <mo stretchy="false">)</mo> <mo>-</mo> <mi>f</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo stretchy="false">)</mo> <mo>-</mo> <mi>f</mi> <mo stretchy="false">(</mo> <mi>y</mi> <mo stretchy="false">)</mo> </mrow> </mtd> <mtd columnalign="left"> <mrow> <mo>=</mo> <mi>α</mi> <mo stretchy="false">(</mo> <mi>x</mi> <mo stretchy="false">)</mo> <mi>α</mi> <mo stretchy="false">(</mo> <mi>y</mi> <mo stretchy="false">)</mo> <mo>.</mo> </mrow> </mtd> </mtr> </mtable> </mrow> </math></EquationSource> </Equation>Our results extend previous work on the bilinearity of the Cauchy exponential difference by Alzer and Matkowski. We characterize solutions under various structural and regularity assumptions, including additive and exponential Cauchy differences, and show that solutions often reduce to additive functions, exponential polynomials, or combinations thereof. For Levi-Civita type equations, we provide explicit representations of solutions in terms of additive and exponential components. Furthermore, we determine conditions under which real-valued solutions exist and describe their forms. The paper concludes with open problems concerning generalized equations that cannot be solved by the methods presented here, suggesting directions for future research.</p>

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Perturbations of Cauchy differences

  • Eszter Gselmann,
  • Tomasz Małolepszy,
  • Janusz Matkowski

摘要

This paper investigates functional equations arising from perturbations of Cauchy differences. We study equations of the form \( f(x+y)-f(x)-f(y)=B(x,y) \quad \text {or} \quad f(xy)-f(x)f(y) = B(x,y) \) f ( x + y ) - f ( x ) - f ( y ) = B ( x , y ) or f ( x y ) - f ( x ) f ( y ) = B ( x , y ) where B is a biadditive mapping, and also more general cases where the inhomogeneity depends on unknown functions \(\begin{aligned} f(x+y)-f(x)-f(y)&= \alpha x y \\ f(x+y)-f(x)-f(y)&= \alpha (x y)\\ f(x+y)-f(x)-f(y)&= \alpha (x)\alpha (y). \end{aligned}\) f ( x + y ) - f ( x ) - f ( y ) = α x y f ( x + y ) - f ( x ) - f ( y ) = α ( x y ) f ( x + y ) - f ( x ) - f ( y ) = α ( x ) α ( y ) . Our results extend previous work on the bilinearity of the Cauchy exponential difference by Alzer and Matkowski. We characterize solutions under various structural and regularity assumptions, including additive and exponential Cauchy differences, and show that solutions often reduce to additive functions, exponential polynomials, or combinations thereof. For Levi-Civita type equations, we provide explicit representations of solutions in terms of additive and exponential components. Furthermore, we determine conditions under which real-valued solutions exist and describe their forms. The paper concludes with open problems concerning generalized equations that cannot be solved by the methods presented here, suggesting directions for future research.