Oktober 17, 2013
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Kategorie: FX Ind

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Smoothed ADX by John Ehlers [ ru | cn ]

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MetaQuotes (2008.02.10 15:45)

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ADX_Smoothed.mq4 (3.6 Kb) Beskou

Indicator Smoothed ADX was written on demand of a forum visitor and was not too difficult. Egter, the search for a description of the smoothed ADX algorithm resulted in nothing. This is why I give below only the code that has been provided:

Insette: {declaring inputs}
Length( 14 ),
ADXTrend( 25 ), alpha1(0.25), alpha2(0.33);

variables: {declaring variables}
DMIPlus( 0 ), DMIMinus( 0 ), DMI( 0 ), ADX( 0 ),
DIPlusLead(0), DIMinusLead(0), DIPlusFinal(0), DIMinusFinal(0),
ADXLead(0), ADXFinal(0);

{now calling the built-in ADX functions, so we don't need to calculate them}

Value1 = DirMovement( H, L, C, Length, DMIPlus, DMIMinus, ADX);

{this part is the actual smoothing of the original ADX indicator, DI+, DI- and ADX lines are smoothed}

DIPlusLead = 2*DMIPlus + (alpha1 - 2) * DMIPlus[1] + (1 - alpha1) * DIPlusLead[1];
DIPlusFinal = alpha2*DIPlusLead + (1 - alpha2) * DIPlusFinal[1];

DIMinusLead = 2*DMIMinus + (alpha1 - 2) * DMIMinus[1] + (1 - alpha1) * DIMinusLead[1];
DIMinusFinal = alpha2*DIMinusLead + (1 - alpha2) * DIMinusFinal[1];

ADXLead = 2*ADX + (alpha1 - 2) * ADX[1] + (1 - alpha1) * ADXLead[1];
ADXFinal = alpha2*ADXLead + (1 - alpha2) * ADXFinal[1];

{Plotting them on chart}

Plot1( DIPlusFinal, "DMI+" ) ;

Plot2( DIMinusFinal, "DMI-" ) ;
Plot3( ADXFinal, "ADX" ) ;

Indeed, if you don't try to get into the deep sense underlying the initial text of the smoothed ADX, this smoothing can be divided into two stages. Suppose we have a numerical sequence P and we have to smooth it with a minimum lag. Vir dit, we build at the first stage function V(P) of P-sequence oscillation from the following formula:

V0 = (8*P0 - 7*P1 + 3*V1) / 4,
waar:

P0 is the current value of the sequence (a price or an indicator);

P1 is the preceding value of the sequence;

V1 is the preceding value of oscillation;

V0 is the current value of oscillation.

Of, in a different way:

V0 = (Vol(P) + 3*V1) / 4,
waar:

Vol(P) = 8*P0 - 7P1 - Ehlers' burst (the term is invented by myself).

At the second stage, we apply the simple weighted smoothing:

W0 = (1*V0 + 2*W1) / (2 + 1).
waar:

W0 is the current smoothed value of sequence P;

V0 is the current value of P-sequence oscillation;

W1 is the preceding smoothed value.

In Smoothed ADX, this smoothing algorithm is applied to all three buffers of standard indicator ADX. This is why the obtained indicator is called Smoothed ADX. If we were smoothing indicator RSI, we would call it Smoothed RSI, ens. The figure below shows that Smoothed ADX, indeed, is not so 'twitchy' as the original, standard ADX (Average Directional Movement Index).

1 kommentaar lewer Om 'n nuwe opmerking te plaas, asseblief teken aan of registreer

This is a reallly good indicator. Thanks Rosh! I have one question. How would I compare the current ADXFinal value with the ADXFinal value 3 periods ago? Shouldn't it already be housed in the array? Indien wel, waar? I the array count down confused me a bit as it's been a long time since I've coded. TIA.

john ehlers

Skrywer: Forex Wiki-span

Ons is 'n span hoogs ervare Forex Handelaars [2000-2023] wat daaraan toegewy is om die lewe op ons eie terme te leef. Ons primêre doelwit is om finansiële onafhanklikheid en vryheid te verkry, en ons het selfonderrig nagestreef en uitgebreide ondervinding in die Forex-mark opgedoen as ons manier om 'n selfvolhoubare leefstyl te bereik.

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