Расчет Гаммы в Разработчике стратегий

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Расчет Гаммы в Разработчике стратегий, Неверно считается Гамма
 
Добрый день. В разработчике стратегий гамма считается учитывая все перечисленные инструменты в списке. Даже те, которые не отмечены галочками. В итоге значение гаммы не верно для выбранной позиции.

Гамма должна считаться только для тех инструментов, "которые участвуют в стратегии", т.е. отмечены галочками в чекбоксах.
 
Добрый день.
Какой шаблон стратегии Вы используете? Какая версия рабочего места Quik   и версия плагина StratVolat.dll? Пришлите скриншот настройки стратегии.
 
Шаблон стратегии не использую. Открыл окно, в нем сразу есть фьючерс. Я снимаю с него галочку, и накидываю сам фьючерсов и опционов. В итоге тот фьючерс который был изначально, даже со снятой галочкой учитывается в расчете греков. Квик 6.17.1.17  Как посмотреть версию dll незнаю.
 
Получилось удалить этот фьючерс. Раньше нельзя было почему то. Только после сохранения и перезапуска программы и загрузки портфеля. Но греки по прежнему не верные.
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[/img]
 
Вот блин, картинка не распарсилась ((
 
Как картинку то можно отправить? )
 
Eugene, Указали такие же данные как у Вас на скриншоте. Если ставишь/снимаешь галку Фьючерс, В таблице Греки - Гамма меняется.
Как Вы определяете что удалённый Фьючерс участвует в расчёте? Приведите Ваши расчёты или снимите видео, где данные не меняются и пришлите нам, пожалуйста.
 
Позиция следующая:
Тип   Дата   Страйк   Кол-Во   Цена
Колл 15.07.201  97500   10    1070
Колл 15.07.201  100000   1    10
Колл 15.07.201  102500   4     10

Гамму показывает 0,0443, в то время, как по расчетам дельты должна быть 0,000443
 
гамма опциона (кривизна опциона) — это скорость изменения дельты опциона с изменением цены базового контракта. Обычно гамму опциона выражают через изменение дельты на 1 пункт изменения цены базового контракта. Если гамма равна 5, то при росте базового контракта на 1 п дельта опциона вырастет на 5.

По гамме, я знаю насколько изменится дельта при изменении цены БА на 1 тик. РТС = 10. Т.е. я могу посчитать где дельта будет равна 1 при движении РТСа. Например, для данной позы: 1 / 0,000443 = 2260п. Т.е. если РТС сместится на 2260п в любую сторону, от страйка, дельта должна быть равна 1. Что похоже на правду. В то время как если бы дельта увеличивалась бы на 0,0443, как показывает квик, то дельта будет равна 1 уже при смещении БА на 30п.

Может я что то не понимаю?
 
Или возможно, по умолчанию вы ее считаете на 1000п?
 
Цитата
Eugene пишет:

Гамму показывает 0,0443, в то время, как по расчетам дельты должна быть 0,000443
Ну вообще-то, если вы обратите внимание, то в поле указана гамма в процентах.
стало быть, если это значение пересчитать в доли, то и будет искомое 0.000443
Цитата
Eugene пишет:
Т.е. я могу посчитать где дельта будет равна 1 при движении РТСа. Например, для данной позы: 1 / 0,000443 = 2260п. Т.е. если РТС сместится на 2260п в любую сторону, от страйка, дельта должна быть равна 1. Что похоже на правду.
Где же это похоже-то? Вы хоть вдумайтесь в цифры: 2500 пп для ртс - это тьфу. нервное движение за один час.
По вашей формуле нужно делить не единицу, а 10 (цена пп для ртс) на гамму, т.е.
10 / 0.000443 = 22573 - а вот это уже похоже на правду.
 
Цитата
IMmediately ARriving пишет:
Где же это похоже-то? Вы хоть вдумайтесь в цифры: 2500 пп для ртс - это тьфу. нервное движение за один час.
По вашей формуле нужно делить не единицу, а 10 (цена пп для ртс) на гамму, т.е.
10 / 0.000443 = 22573 - а вот это уже похоже на правду.
Вдумайтесь? Мы или о разных РТСах говорим, или одно из двух. Я про фьючерс на индекс РТС - RTS-9.15.  Говорите 25000пп это тьфу для него? Ваши слова бы да Богу в уши! Вчера 2000пп шли 9 часов.

Цитата
IMmediately ARriving пишет:
Ну вообще-то, если вы обратите внимание, то в поле указана гамма в процентах.
Где я должен на это обратить внимание? Лично я смотню на нее в поле Греки в основном окне стратегии, а не на вкладке. В таком случае допишите туда знак процента.

Думаю правильнее ее было бы отображать не в процентах.

Но в целом вопрос снят. Просто особенности терминала. Спасибо.
 
Цитата
Eugene пишет:
Обычно гамму опциона выражают через изменение дельты на 1 пункт изменения цены базового контракта.
Уважаемые разработчики, если можно, может выразить ее не в процентах?
 
Цитата
Eugene пишет:
Вдумайтесь? Мы или о разных РТСах говорим, или одно из двух. Я про фьючерс на индекс РТС - RTS-9.15.Говорите 25000пп это тьфу для него? Ваши слова бы да Богу в уши! Вчера 2000пп шли 9 часов.
Вы сначала разберитесь с порядком числа: 25000(двадцать пять тысяч) или 2000(две тысячи)?, а потом говорите.
Цитата
Eugene пишет:
Где я должен на это обратить внимание? Лично я смотню на нее в поле Греки в основном окне стратегии, а не на вкладке. В таком случае допишите туда знак процента.
Я вижу на вкладке Greeks в окошке вверху-слева.
там надо колонку чутка раздвинуть чтобы увидеть "в %". :)
Цитата
Eugene пишет:
Уважаемые разработчики, если можно, может выразить ее не в процентах?
Обратитесь в поддержку, заведите пожелание :)....
а пока - пользуйтесь как есть.
 
Цитата
Imersio Arrigo пишет:
Вы сначала разберитесь с порядком числа: 25000(двадцать пять тысяч) или 2000(две тысячи)?, а потом говорите.
Вот вот... От очумения в ваших расчетах даже лишний ноль дописал ))). А Вы, пожалуйста, следующий раз прежде чем писать подобные вещи, потрудитесь хотя бы вникнуть в суть дела.
 
Цитата

Eugene пишет:
Вот вот... От очумения в ваших расчетах даже лишний ноль дописал ))). А Вы, пожалуйста, следующий раз прежде чем писать подобные вещи, потрудитесь хотя бы вникнуть в суть дела.
Нормально )) вот и благодарность.
ну да ладно, дело ваше.  
 
Цитата
Imersio Arrigo пишет:
Нормально )) вот и благодарность.
ну да ладно, дело ваше.
Извиняюсь )
 
Цитата
Imersio Arrigo пишет:
Нормально )) вот и благодарность.
ну да ладно, дело ваше.
Форум что прошлый был не удобный, что этот.
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