Dynamic hedging with stocastic differential utility
| Autor(a) principal: | |
|---|---|
| Data de Publicação: | 2003 |
| Tipo de documento: | Artigo |
| Idioma: | eng |
| Título da fonte: | Repositório Institucional do FGV (FGV Repositório Digital) |
| Texto Completo: | http://hdl.handle.net/10438/12448 |
Resumo: | In this paper we study the dynamic hedging problem using three different utility specifications: stochastic differential utility, terminal wealth utility, and we propose a particular utility transformation connecting both previous approaches. In all cases, we assume Markovian prices. Stochastic differential utility, SDU, impacts the pure hedging demand ambiguously, but decreases the pure speculative demand, because risk aversion increases. We also show that consumption decision is, in some sense, independent of hedging decision. With terminal wealth utility, we derive a general and compact hedging formula, which nests as special all cases studied in Duffie and Jackson (1990). We then show how to obtain their formulas. With the third approach we find a compact formula for hedging, which makes the second-type utility framework a particular case, and show that the pure hedging demand is not impacted by this specification. In addition, with CRRA- and CARA-type utilities, the risk aversion increases and, consequently the pure speculative demand decreases. If futures price are martingales, then the transformation plays no role in determining the hedging allocation. We also derive the relevant Bellman equation for each case, using semigroup techniques. |
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Bueno, Rodrigo de Losso da SilveiraEscolas::EPGEFGV2014-11-17T12:16:53Z2014-11-17T12:16:53Z2003-05-22http://hdl.handle.net/10438/12448In this paper we study the dynamic hedging problem using three different utility specifications: stochastic differential utility, terminal wealth utility, and we propose a particular utility transformation connecting both previous approaches. In all cases, we assume Markovian prices. Stochastic differential utility, SDU, impacts the pure hedging demand ambiguously, but decreases the pure speculative demand, because risk aversion increases. We also show that consumption decision is, in some sense, independent of hedging decision. With terminal wealth utility, we derive a general and compact hedging formula, which nests as special all cases studied in Duffie and Jackson (1990). We then show how to obtain their formulas. With the third approach we find a compact formula for hedging, which makes the second-type utility framework a particular case, and show that the pure hedging demand is not impacted by this specification. In addition, with CRRA- and CARA-type utilities, the risk aversion increases and, consequently the pure speculative demand decreases. If futures price are martingales, then the transformation plays no role in determining the hedging allocation. We also derive the relevant Bellman equation for each case, using semigroup techniques.engEscola de Pós-Graduação em Economia da FGVSeminários de pesquisa econômica da EPGETodo cuidado foi dispensado para respeitar os direitos autorais deste trabalho. Entretanto, caso esta obra aqui depositada seja protegida por direitos autorais externos a esta instituição, contamos com a compreensão do autor e solicitamos que o mesmo faça contato através do Fale Conosco para que possamos tomar as providências cabíveisinfo:eu-repo/semantics/openAccessRecursive utilityHedgingBellman equationStochastic controlEconomiaHedging (Finanças)Equações diferenciais estocásticasDynamic hedging with stocastic differential utilityinfo:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/articlereponame:Repositório Institucional do FGV (FGV Repositório Digital)instname:Fundação Getulio Vargas (FGV)instacron:FGVORIGINAL1140.pdf1140.pdfapplication/pdf412436https://repositorio.fgv.br/bitstreams/17b5f25a-a0e6-4aa9-a7a6-43372a3f3538/download88be4e8d6548dec60604abc1e213b90eMD51LICENSElicense.txtlicense.txttext/plain; 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| dc.title.eng.fl_str_mv |
Dynamic hedging with stocastic differential utility |
| title |
Dynamic hedging with stocastic differential utility |
| spellingShingle |
Dynamic hedging with stocastic differential utility Bueno, Rodrigo de Losso da Silveira Recursive utility Hedging Bellman equation Stochastic control Economia Hedging (Finanças) Equações diferenciais estocásticas |
| title_short |
Dynamic hedging with stocastic differential utility |
| title_full |
Dynamic hedging with stocastic differential utility |
| title_fullStr |
Dynamic hedging with stocastic differential utility |
| title_full_unstemmed |
Dynamic hedging with stocastic differential utility |
| title_sort |
Dynamic hedging with stocastic differential utility |
| author |
Bueno, Rodrigo de Losso da Silveira |
| author_facet |
Bueno, Rodrigo de Losso da Silveira |
| author_role |
author |
| dc.contributor.unidadefgv.por.fl_str_mv |
Escolas::EPGE |
| dc.contributor.affiliation.none.fl_str_mv |
FGV |
| dc.contributor.author.fl_str_mv |
Bueno, Rodrigo de Losso da Silveira |
| dc.subject.eng.fl_str_mv |
Recursive utility Hedging Bellman equation Stochastic control |
| topic |
Recursive utility Hedging Bellman equation Stochastic control Economia Hedging (Finanças) Equações diferenciais estocásticas |
| dc.subject.area.por.fl_str_mv |
Economia |
| dc.subject.bibliodata.por.fl_str_mv |
Hedging (Finanças) Equações diferenciais estocásticas |
| description |
In this paper we study the dynamic hedging problem using three different utility specifications: stochastic differential utility, terminal wealth utility, and we propose a particular utility transformation connecting both previous approaches. In all cases, we assume Markovian prices. Stochastic differential utility, SDU, impacts the pure hedging demand ambiguously, but decreases the pure speculative demand, because risk aversion increases. We also show that consumption decision is, in some sense, independent of hedging decision. With terminal wealth utility, we derive a general and compact hedging formula, which nests as special all cases studied in Duffie and Jackson (1990). We then show how to obtain their formulas. With the third approach we find a compact formula for hedging, which makes the second-type utility framework a particular case, and show that the pure hedging demand is not impacted by this specification. In addition, with CRRA- and CARA-type utilities, the risk aversion increases and, consequently the pure speculative demand decreases. If futures price are martingales, then the transformation plays no role in determining the hedging allocation. We also derive the relevant Bellman equation for each case, using semigroup techniques. |
| publishDate |
2003 |
| dc.date.issued.fl_str_mv |
2003-05-22 |
| dc.date.accessioned.fl_str_mv |
2014-11-17T12:16:53Z |
| dc.date.available.fl_str_mv |
2014-11-17T12:16:53Z |
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info:eu-repo/semantics/publishedVersion |
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info:eu-repo/semantics/article |
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article |
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publishedVersion |
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http://hdl.handle.net/10438/12448 |
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http://hdl.handle.net/10438/12448 |
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eng |
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eng |
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Seminários de pesquisa econômica da EPGE |
| dc.rights.driver.fl_str_mv |
info:eu-repo/semantics/openAccess |
| eu_rights_str_mv |
openAccess |
| dc.publisher.none.fl_str_mv |
Escola de Pós-Graduação em Economia da FGV |
| publisher.none.fl_str_mv |
Escola de Pós-Graduação em Economia da FGV |
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reponame:Repositório Institucional do FGV (FGV Repositório Digital) instname:Fundação Getulio Vargas (FGV) instacron:FGV |
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