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Let $u,v$ be two plurisubharmonic functions in a domain $\Omega\subset \mathbb{C}^n.$ Then $w=\max$ {$u,v$} is plurisubharmonic. The support of $dd^c w$ is unclear in {$z: u(z)=v(z)$}

How to estimate $dd^c w$ by $dd^c u$ and $dd^c v$? Generally, is there any information on $dd^c$ of a combination of $"max", "min", "+,-"$ operators of a family of plursisubharmonic functions?

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I am writing everything in dimension 1; $dd^c=\Delta$.

You cannot estimate $\Delta\max( u,v)$ in terms of $\Delta u$ and $\Delta v$. Example $u(x,y)=x,\; v(x,y)=ax$.

Relations between $\Delta$ of $u,v,$ their max and min were studied in the paper Eremenko, Fuglede, Sodin, On the Riesz charge of the lower envelope of delta-subharmonic functions. Potential Analysis, 1992, vol. 1, N 2, 191-204. Also available as No. 58 on my web site, http://www.math.purdue.edu/~eremenko/papers.html

There are references to other results on the topic in this paper. See also my survey talk No. 98 on the same web page for applications of such relations.

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  • $\begingroup$ In your example $\max \{u,v\}$ is a subharmonic function, so it satisfies $\Delta \max\{u,v\} \geq 0=\min \{\Delta u, \Delta v\}$ in the sense of distributions. So your example shows that the estimate $\Delta \max\{u,v\} \geq \min \{\Delta u, \Delta v\}$ cannot be in general improved when one of $u,v$ is harmonic. $\endgroup$ Aug 5, 2012 at 16:39
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Under some additional assumptions one can prove that $dd^c \max (u,v) \geq \min (dd^cu,dd^cv)$ in $\Omega$. The proof seems long-winded for such a simple statement, but this is the best I can think of now. First of all, I will assume that $u$ and $v$ are continuous in $\Omega \subset \mathbb{C}^n$ and let $w:=\max(u,v)$. I will also use a criterion of positivity of currents of degree $(n-p,n-p), \quad 0 \leq p \leq n$ in $\Omega$. Let $L$ be a complex linear subspace of $\mathbb{C}^n$ of dimension $p$ and let $g \in \rm U(n)$ be such that $g(L)$ is defined by equations $u_{p+1}=...=u_n=0$. Define a $(p,p)$-form $\tau(L):= g^*\hat{\beta}$, where $\hat{\beta}=(i/2)du_1\wedge d\bar{u}_1\wedge...\wedge (i/2)du_p\wedge d\bar{u}_p$. This does not depend on the choice of orthonormal coordinates and gives a positive form. Now, Proposition 2.10 in: P. Lelong, L. Gruman: Entire functions of several complex variables, Springer-Verlag 1986 says the following: A $(n-p,n-p)$-current $T$ in $\Omega$ is positive if and only if for every linear subspace $L$ of dimension $p$ the current $T \wedge \tau(L)$ is a positive distribution (and hence a measure). Because of linearity of $dd^c$ and of the equality $dd^ch \wedge S = dd^c(hS)$, which holds when u is plurisubharmonic and locally integrable with respect to the mass of $S$, it is enough to prove that $dd^c w \wedge \tau(L) \geq \min(dd^cu,dd^cv) \wedge \tau(L)$ for every linear subspace $L$ of dimension $n-1$. Here is the proof, modeled on Proposition 2.8 in: Bedford, Eric; Taylor, B. A.: The Dirichlet problem for a complex Monge-Amp`{e}re equation. \emph{Invent. Math. 37} (1976), no. 1, 1-44. The authors of this paper study Monge-Ampere measures, not trace measures, but the argument goes through. I cannot resist reproducing it here in full, partly because of their cute application of the fact that an uncountable sum of positive real numbers is infinite (for the proof of it, see e.g. http://www.xamuel.com/uncountable-sums/; there is also related discussion in https://math.stackexchange.com/questions/70194/does-uncountable-summation-with-a-finite-sum-ever-occur-in-mathematics).

Claim: Let $\Omega,u,v,w$ be as above. If for every $L$ of complex dimension $n-1$ the measure $\mu_L := \min(dd^cu, dd^cv) \wedge \tau(L)$ is finite, then $dd^c w \wedge \tau(L)\geq \min(dd^cu, dd^cv)\wedge \tau(L)=\mu_L$. Proof: Consider first the case when $\mu_L(\{u=v\})=0$. Let $\Omega_1 = \{u<v\}$,$\Omega_2=\{v<u\}$. Then $dd^cw \wedge \tau(L)=dd^cv \wedge \tau(L)\geq \mu_L$ in $\Omega_1$ and similarly $dd^cw \geq \min(dd^cu, dd^cv)$ in $\Omega_2$. And of course $dd^cw \wedge \tau(L)(\{u=v\}) \geq 0 = \mu_L(\{u=v\})$.\ Now let us consider $L$ such that $\mu_L(\{u=v\})> 0$. Then replacing $v$ by $v+\varepsilon$ for small $\varepsilon$ we still have $\mu_L = \min(dd^cu, dd^c(v+\varepsilon)) \wedge \tau(L)$ and arguing as above we can prove that $dd^c \max(u,v+\varepsilon) \wedge \tau(L) \geq \mu_L$ for all $\varepsilon$ for which $\mu_L(\{z\in \mathbb{C}^n: u(z)=v(z)+\varepsilon \})=0$. This happens for all but countably many $\varepsilon$ , which allows us to obtain the inequality in the general case by letting $\varepsilon \to 0$ in a way that avoids those countably many values.

I do not know if and how the assumption of continuity can be relaxed. Bedford and Taylor give a counterexample of discontinuous plurisubharmonic functions for which the inequality $(dd^cw)^n \geq \min((dd^cu)^n,(dd^cv)^n)$ does not hold. If one wants to know which currents satisfy the assumption of finiteness of the trace measures, one should look at Fornaess, John Erik; Sibony, Nessim: Oka's inequality for currents and applications. \emph{Math. Ann. 301} (1995), no. 3, 399-419, where similar estimates were investigated.

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  • $\begingroup$ Exactly, I would like to understand the value of $dd^c$ on {$u=v$} more clearly, it seems that there is very few literature on this problem. Anyway, thanks for your answer. $\endgroup$
    – vu viet
    Dec 10, 2011 at 16:55
  • $\begingroup$ There is some literature, at least for subharmonic functions. Besides the paper I mentioned above, there are several papers on the "Grishin Lemma": if $u\geq 0$ is a difference of two subharmonic functions, then the restriction of $\Delta u$ on the set $u=0$ is a non-negative measure. I believe you can prove similar results for the plurisubharmonic case. $\endgroup$ Aug 6, 2012 at 8:31
  • $\begingroup$ Fuglede, Bent Some properties of the Riesz charge associated with a ∂-subharmonic function. Potential Anal. 1 (1992), no. 4, 355–371. $\endgroup$ Aug 6, 2012 at 17:42

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